A Introduction
In this paper, we continue the study of weighted Hodge ideals that started in [Reference OlanoOla22], where the focus was the $0$ -th weighted Hodge ideals, also called weighted multiplier ideals. We show that several results satisfied by the weighted multiplier ideals can be generalized under suitable conditions.
Let X be a smooth complex variety of dimension n. To an effective reduced divisor D on X one can associate a sequence of ideal sheaves $I_p(D)\subseteq \mathscr {O}_X$ , called the Hodge ideals of D and studied in a series of papers [Reference Mustaţă and PopaMP19a], [Reference Mustaţǎ and PopaMP18], [Reference Mustaţǎ and PopaMP19b], [Reference Mustaţă and PopaMP20b], [Reference Mustaţă and PopaMP20a]. They arise from the theory of mixed Hodge modules of M. Saito, which induces a Hodge filtration $F_{\bullet }\mathscr {O}_X(*D)$ by coherent $\mathscr {O}_X$ -modules on $\mathscr {O}_X(*D)$ , the sheaf of functions with poles along D, seen as a left $\mathscr {D}_X$ -module. This $\mathscr {D}$ -module underlies the mixed Hodge module $j_*\mathbb {Q}^H_{U}[n]$ , where $j: U=X\setminus D\hookrightarrow X$ . Saito showed that the Hodge filtration is contained in the pole order filtration, that is,
for all $p\geq 0$ . Consequently, we can define the Hodge ideal $I_p(D)$ by
The $\mathscr {D}_X$ -module $\mathscr {O}_X(*D)$ is also endowed with a weight filtration $W_{\bullet }\mathscr {O}_X(*D)$ by $\mathscr {D}_X$ -submodules. The Hodge filtration of these submodules satisfies
and similarly we can define the weighted Hodge ideals by
The weighted Hodge ideals form a chain of inclusions
We can always understand the two extreme ideals in this chain. The first element in the list admits an easy description:
On the other end, the last ideal in this chain is the usual p-th Hodge ideal, that is,
Unlike $I_p^{W_0}(D)$ , for all the other degrees, the support of the scheme defined by $I_p^{W_l}(D)$ is contained in the singular locus of D.
Birational definition We give an alternative description of the weighted Hodge ideals in terms of a resolution of singularities. Let $f:Y\to X$ be a resolution of singularities of the pair $(X,D)$ which is an isomorphism over $X\setminus D$ , and let $E := (f^*D)_{\mathrm {red}}$ . This description stems from the birational definition of Hodge ideals in [Reference Mustaţă and PopaMP19a, §9], and uses right $\mathscr {D}$ -modules. The $\mathscr {D}_Y$ -module $\omega _Y(*E)$ admits a filtered resolution by $\mathscr {D}_Y$ -modules given by
Similarly, using the weight filtration on the sheaves of logarithmic p-forms (see equation (1.4)), we show that the complex
is filtered quasi-isomorphic to the $\mathscr {D}_X$ -module $W_{n+l}\omega (*E)$ (see Proposition 4.1).
The $\mathscr {D}_X$ -module $\omega _X(*D)$ can be described using the filtered resolution of $\omega _Y(*E)$ described above. More precisely, we can define the complex $A^{\bullet }$ by
placed in degrees $-n, \ldots , 0$ , and we have that,
(see [Reference Mustaţă and PopaMP19a, §9]). To give the alternative description of the weighted Hodge ideals, we introduce the complex $C^{\bullet }_{l,p-n}$ defined as
and we show that the image of
is precisely $F_{p-n}W_{n+l}\omega _X(*D) = I^{W_l}_p(D) \otimes \omega _X((p+1)D)$ (see Proposition 4.3).
Description of weighted Hodge ideals using the V -filtration. A very convenient local description of Hodge ideals was given in terms of the Kashiwara–Malgrange V-filtration of the graph embedding $i_+\mathscr {O}_X$ in [Reference Mustaţă and PopaMP20b, Theorem A’] (see equation (5.1)), which works in the more general setting of Hodge ideals of $\mathbb {Q}$ -divisors. In this case, we suppose that the reduced divisor $D\subseteq X$ can be defined by a regular function $f\in \mathscr {O}_X(X)$ . Weighted Hodge ideals admit a similar description.
Theorem A. Let X be a smooth complex variety and D a reduced divisor defined by a regular function $f\in \mathscr {O}_X(X)$ . Then,
The proof is based on two ideas. First, we can relate the Hodge filtration of $V^1i_+\mathscr {O}_X$ with that of $\mathscr {O}_X(*D)$ (see 5.2). Second, the weight filtration on the nearby cycles sheaf can be related to that of the local cohomology sheaf (Proposition 5.3). This is enough to understand all the weighted Hodge ideals in the case when D only has isolated weighted-homogeneous singularities (see Remark 5.7).
The description in Theorem A is useful to relate the weighted Hodge ideals with some invariants of the singularities, like the minimal exponent. Recall that to the variety $D\subseteq X$ we can associate the Bernstein–Sato polynomial $b_D(s)$ . The polynomial $(s+1)$ divides $b_D(s)$ , and we denote $\widetilde {b_D}(s) = b_D(s)/(s+1)$ . The negative of the largest root of $\widetilde {b_D}(s)$ is called the minimal exponent of a D and is denoted $\widetilde {\alpha _D}$ . This invariant encodes important properties of the singularities of D. For instance, it is a refined version of the log-canonical threshold, since $lct(X,D) = \min \{\widetilde {\alpha _D}, 1\}$ . In particular, this implies that $(X,D)$ is log-canonical if and only if $\widetilde {\alpha _D} \geq 1$ . Moreover, it is a result of Saito that D has rational singularities if and only if $\widetilde {\alpha _D}>1$ .
The notions of log-canonicity and rationality can be described in terms of weighted Hodge ideals. Recall that 0-th weighted Hodge ideals, or weighted multiplier ideals, form a sequence of ideals interpolating between the adjoint ideal and a multiplier ideal. This is the case, as $I_0^{W_1}(D) = \operatorname {\mathrm {adj}}(D)$ (see, for instance, [Reference OlanoOla22, Theorem A]) and $I_0(D) = \mathcal {J}((1-\varepsilon )D)$ for $0<\epsilon \ll 1$ [Reference Budur and SaitoBS05]. These two ideals identify if a singularity is respectively rational or log-canonical. We give an analogous description for the higher weighted Hodge ideals. The Hodge ideal $I_p(D)$ is trivial if and only if $\widetilde {\alpha _D}\geq p+1$ , in which case we say that $(X,D)$ is p-log-canonical. Also, the weighted Hodge ideal $I_p^{W_1}(D)$ is trivial if and only if $\widetilde {\alpha _D}> p+1$ (see Corollary 5.10), which some authors referred to as D being p-rational. The rest of the p-weighted Hodge ideals filter and measure the ‘distance’ between $(X,D)$ having p-log-canonical singularities and D being p-rational.
Isolated singularities. Recall that the weighted Hodge ideals satisfy
The difference between the two ideals can be described by the coherent sheaf $F_p\operatorname {\mathrm {gr}}^W_{n+l}\mathscr {O}_X(*D)$ (see equation (6.1)). If D has isolated singularities, we give a description of the dimension of this sheaf at the singular points in terms of a resolution of singularities. For this, possibly after restricting to an open set, assume D has one isolated singularity $x\in D$ . In this case, there exists a pure Hodge structure $H_l$ for $l\geq 2$ , such that the dimension of their Hodge pieces describes the desired dimension. More concretely,
(see §6 for more details). For this reason, to find the difference between two consecutive weighted Hodge ideals, it is enough to compute the dimensions of the spaces $\operatorname {\mathrm {Gr}}_F^{n-p}H_l$ .
Theorem B. Let $g:\widetilde {D}\to D$ be a log-resolution of singularities that is an isomorphism outside of x. Let $G\subseteq \widetilde {D}$ be the exceptional divisor. Then
if $l\geq 3$ , and
where $H^k(G) = H^k(G,\mathbb {C})$ and $h^{p,q}(H^k(G)) = \dim (H^{p,q}(\operatorname {\mathrm {Gr}}^W_{p+q}H^k(G)))$ .
When $p =0$ the second summand in the description of $\dim (\operatorname {\mathrm {Gr}}_F^{n-p}H_2)$ is 0 because the dimension of G is $n-2$ , and therefore these dimensions are described as Hodge numbers of the middle cohomology of G. For $p\geq 1$ we cannot expect this term to be 0 in general, but this dimension admits a geometric interpretation (see Remark 6.8).
Vanishing results. Weighted Hodge ideals satisfy global results under suitable conditions. Let X be a smooth projective variety and D an ample divisor with at most isolated singularities. Under this assumptions, when $p=0$ we have that
for $i\geq 1$ and $l\geq 2$ [Reference OlanoOla22, Theorem E]. To generalize this result for all $p\geq 1$ , we require the condition that $I_{p-1}^{W_l}(D) = \mathscr {O}_X$ .
Theorem C. Let X be a smooth projective variety of dimension n, and D an ample reduced effective divisor with at most isolated singularities. Suppose that $I_{p-1}^{W_1}(D)$ is trivial. Then
-
1. For $l\geq 2$ and $i\geq 2$ ,
$$\begin{align*}H^i(X, \omega_X((p+1)D) \otimes I_p^{W_l}(D))= 0.\end{align*}$$ -
2. If $H^j(X, \Omega _X^{n-j}((p-j+1)D)) = 0$ for all $1\leq j\leq p$ , then
$$\begin{align*}H^1(X, \omega_X((p+1)D) \otimes I_p^{W_l}(D))= 0\end{align*}$$for $l\geq 2$ .
When $l=1$ and $i=1$ the vanishing does not hold in general. For an example see Remark 7.2. A Kodaira-type vanishing result is also satisfied for all $l\geq 1$ , and the proof is based on a vanishing result by Saito [Reference SaitoSai90, Proposition 2.33] (see Proposition 8.1).
Applications. The global and local results we have discussed can be used to obtain results about the geometry of certain isolated singularities of hypersurfaces in $\mathbb {P}^n$ . This is because the vanishing condition in Theorem C is satisfied when X is a toric variety.
Corollary D. Let $D\subseteq \mathbb {P}^n$ be a hypersurface of degree d with at most isolated singularities. Let $Z_{l,p}$ be the scheme defined by $I_p^{W_l}(D)$ . Then,
for $k\geq (p+1)d-n-1$ if $l\geq 2$ , and $k\geq (p+1)d - n$ if $l\geq 1$ .
This result gives a bound on a certain type of isolated singularities we describe next. For simplicity, suppose D has at most one isolated singularity $x\in D$ , and assume $\widetilde {\alpha _D} = p+1$ . We describe first the case $p=0$ . This case corresponds to a log-canonical and not rational singularity. In this case, according to equation (0.1), the length of the scheme described by $I_0^{W_1}(D)$ is determined by $\operatorname {\mathrm {Gr}}_F^0(H^{n-2}(G))$ , using the notation of Theorem B. Ishii proved that in this case, $\dim (\operatorname {\mathrm {Gr}}_F^0(H^{n-2}(G))) = 1$ [Reference IshiiIsh85, Proposition 3.7]. This means that the ideal $I_0^{W_1}(D)$ is the maximal ideal of x in X and that there exists exactly one degree $l\geq 2$ such that
while the dimension for the other degrees is 0. A log-canonical singularity is of type $(0,n-l)$ in this case [Reference IshiiIsh85, Definition 4.1].
Assume now that $\widetilde {\alpha _D} = p+1$ for an $p\in \mathbb {Z}_{\geq 0}$ and that D has at most one isolated singularity $x\in D$ . In this case, we have an analogous picture. Namely, the ideal $I_p^{W_1}(D)$ is the maximal ideal of x in X (see Proposition 9.1), or equivalently, as $I_p(D) = \mathscr {O}_X$ , the length of the scheme described by $I_p^{W_1}(D)$ is 1. This in particular means that
for $l \geq 2$ and $0\leq r \leq p-1$ by equation (0.1) and Theorem B. Moreover, by the same results, we know that there exists exactly one degree $l\geq 2$ such that
while the dimension for all the other degrees is 0. Related invariants in similar conditions have been studied by Friedman and Laza in [Reference Friedman and LazaFL22, Theorem 6.11 and Corollary 6.14].
In analogy to the case of log-canonical singularities, we call the singularity described above of type $(p,n-l-p)$ (see Definition 9.3). Weighted homogeneous singularities with $\widetilde {\alpha _f} = p+1$ are examples of singularities of type $(p,n-2-p)$ and the origin in $Z(x^2+y^2+z^2+u^2w^2+u^4+w^5)\subseteq \mathbb {A}^5$ gives an example of a singularity of type $(1,5-3-1) = (1,1)$ (see Example 9.5). For a hypersurface of $\mathbb {P}^n$ with at most isolated singularities and $\widetilde {\alpha _D} = p+1$ , we give a bound on the number of these singularities (see Corollary 9.6).
Restriction theorem. Finally, we study the behavior of weighted Hodge ideals of a pair $(X,D)$ under the restriction of a hypersurface of X. Let $H\subseteq X$ be a smooth hypersurface, and $D_H$ the restriction of D to H. If $D_H$ is reduced, then we can also consider the pair $(H, D_H)$ and their respective weighted Hodge ideals.
Theorem E. Let X be a smooth variety and D an effective reduced divisor. Let $H\subseteq X$ be a smooth divisor such that $H\subsetneq \operatorname {\mathrm {Supp}}(D)$ and $D_H = D\big \vert _{H}$ is reduced. Then, for every $p\geq 0$ and $l\geq 0$ we have
Moreover, if H is general, then we have an equality.
This is the analogue of the restriction theorem for Hodge ideals [Reference Mustaţǎ and PopaMP18, Theorem A] and for multiplier ideals [Reference LazarsfeldLaz04, Theorem 9.5.1].
B Preliminaries
1 Mixed Hodge modules
In this section, we recall some facts about mixed Hodge modules and set up the notation we use throughout this paper.
Let X be a smooth variety of dimension n. Mixed Hodge modules introduced by Saito in [Reference SaitoSai88] are the main object used throughout this article. For a graded-polarizable mixed Hodge module M, we denote the underlying left regular holonomic $\mathscr {D}_X$ -module by $\mathcal {M}$ . In some contexts, it is more useful to use right $\mathscr {D}_X$ -modules. Recall that if $\mathcal {M}$ is a left $\mathscr {D}_X$ -module, the corresponding right $\mathscr {D}_X$ -module is $\mathcal {M}\otimes _{\mathscr {O}_X}\omega _X$ , where $\omega _X$ is the canonical sheaf. We mostly use left $\mathscr {D}$ -modules, and in case we are using right $\mathscr {D}$ -modules instead, we will say it explicitly.
A mixed Hodge module M is endowed with a weight filtration, which we denote by $W_{\bullet }M$ , and
is the quotient, which is a polarizable Hodge module of weight l. We denote by $F_{\bullet }\mathcal {M}$ the Hodge filtration. The de Rham complex is defined as:
and the Hodge filtration of $\mathcal {M}$ induces a filtration on this complex:
The p-th subquotient of this filtration is the complex
Let D be a reduced effective divisor. The mixed Hodge module we mostly study in this paper is $j_*\mathbb {Q}^H_{U}[n]$ , where $j:U=X\smallsetminus D\hookrightarrow X$ , whose underlying $\mathscr {D}_X$ -module is the sheaf of functions with poles along D denoted by $\mathscr {O}_X(*D)$ . To study $\mathscr {O}_X(*D)$ , it is sometimes convenient to use a resolution of singularities, and the properties of pushforwards. Fix a log-resolution of singularities of $(X,D)$ , that is, a proper birational morphism $f:Y\to X$ such that Y is smooth, it is an isomorphism over U, and $(f^*D)_{red} = E$ is a divisor with simple normal crossings. In this setup, we have that
(see, for example, [Reference Mustaţă and PopaMP19a, Lemma 2.2]). Since E is a simple normal crossings divisor, the weight filtration of the $\mathscr {D}_Y$ -module $\mathscr {O}_Y(*E)$ can be described in terms of the intersections of its irreducible components. The lowest degree of the weight filtration is $n= \dim {Y}$ , that is:
The lowest piece corresponds to the canonical Hodge module of Y:
To describe the rest of the subquotients, we introduce the following very useful notation. Let
The variety
with $E_J = \displaystyle \bigcap _{j\in J} E_j$ , is a smooth and possibly disconnected variety. We denote $i_l: E(l) \to Y$ the map such that on each component is the inclusion. We have that
with a Tate twist (see [Reference Kebekus and SchnellKS21, Prop 9.2]).
In order to describe the weight filtration of a pushforward of a projective morphism, a useful tool is to use the spectral sequence associated to the weight filtration:
which degenerates at $E_2$ , and there is an isomorphism:
[Reference SaitoSai90, Proposition 2.15].
Finally, recall that the sheaf of p-forms with logarithmic poles along E denoted by $\Omega ^p_Y(\log {E})$ are endowed with a weight filtration. This increasing filtration consists of subsheaves
such that if $z_1, \ldots , z_n$ are local coordinates on an open set V, and E is given by the equation
then in V, $W_l\Omega ^p(\log {E})$ is a $\mathscr {O}_V$ module generated by elements of the form
with $i_l\leq r$ and $s\leq k$ (see [Reference Cattani, El Zein, Griffiths and LêCEZGL14, 3.4.1.2] for more details). For $I=\{i_1,\ldots , i_s\}$ and $J=\{j_1,\ldots , j_{p-s}\}$ we use the notation
C Characterizations
2 Definition
In this section, we introduce weighted Hodge ideals using the theory of mixed Hodge modules.
A fundamental result by Saito about the Hodge filtration on $\mathscr {O}_X(*D)$ states that
(see [Reference SaitoSai93, Proposition 0.9]). The definition of Hodge ideals follows from this result. These ideals are denoted by $I_p(D)$ and are defined using the formula
(see [Reference Mustaţă and PopaMP19a, Definition 9.4]). In this article, we study weighted Hodge ideals which are defined similarly using the weight filtration with which $\mathscr {O}_X(*D)$ is endowed. The Hodge filtration of the sub- $\mathscr {D}_X$ modules $W_{n+l}\mathscr {O}_X(*D)$ satisfies
for all $p\geq 0$ .
Definition 2.1 (Weighted Hodge ideals)
Let X be a smooth complex variety and D a reduced divisor. For $l\geq 0$ and $p\geq 0$ , we define the ideal sheaf $I_p^{W_l}(D)$ on X by the formula
We call $I_p^{W_l}(D)$ the l-th weighted p-th Hodge ideal of D.
There is in fact a chain of inclusions
for all $p\geq 0$ . Indeed, the weight filtration of $\mathscr {O}_X(*D)$ is an increasing filtration, hence
or equivalently
3 Simple normal crossings divisor
Weighted Hodge ideals can be described completely when the reduced divisor D has simple normal crossings. In this case, the Hodge filtration of $\mathscr {O}_X(*D)$ is fully understood, and from this information we can deduce the Hodge filtration of $W_{n+l}\mathscr {O}_X(*D)$ .
Let D be a simple normal crossings divisor. In this case, the Hodge filtration of $\mathscr {O}_X(*D)$ admits a simple description:
if $p\geq 0$ and 0 otherwise. Using this, one obtains a local description of the Hodge ideals. Let $x_1, \ldots , x_n$ be coordinates around $z\in X$ , such that D is defined by $(x_1\cdots x_r=0)$ . For every $p\geq 0$ , the ideal $I_p(D)$ is generated around z by
[Reference Mustaţă and PopaMP19a, Proposition 8.2]. Weighted Hodge ideals of D admit a similar local description.
Proposition 3.3. Let $x_1, \ldots , x_n$ be coordinates around $z\in X$ such that D is defined by $(x_1\cdots x_r=0)$ . Then, for every $p\geq 0$ and $l\leq r$ , $I_p^{W_l}(D)$ is generated around z by
where $I = \{1,\ldots , r\}$ . For $l\geq r$ , $I_p^{W_l}(D) = I_p(D)$ around z.
Proof. The Hodge filtration of $W_{n+l}\mathscr {O}_X(*D)$ also admits a simple description:
Indeed, this follows from the fact that $\operatorname {\mathrm {gr}}^W_{n+l}\mathscr {O}_X(*D) \cong i_{l+}\mathscr {O}_{E(l)}$ with a Tate twist so that the analogous statement of equation (3.4) is true for $i_{l+}\mathscr {O}_{E(l)}$ (see, e.g., [Reference SaitoSai09, Remark 1.1 iii]).
For the rest of the proof, we use right $\mathscr {D}$ -modules. By [Reference OlanoOla22, Proposition 4.1],
Around z, $W_l\omega _X(D)$ is generated by
where $\omega $ is the standard generator of $\omega _X$ . It is clear that $W_l\omega _X(D)\cdot F_p\mathscr {D}_X$ is generated by
The result follows from the equation $\frac {\omega }{x_{j_1}^{1+b_1}\cdots x_{j_l}^{1+b_l}} = \frac {\omega }{x_I^{p+1}} (x_{j_1}^{p-b_1}\cdots x_{j_l}^{p-b_l}x_{I\setminus J}^{p+1})$ . The last statement follows from the fact that, if $l>r$ , around z, $W_l\omega _X(D) = \omega _X(D)$ .
4 Birational definition
Let X be a smooth variety and D a reduced divisor. Consider a log-resolution $f:Y\to X$ of the pair $(X,D)$ , which is an isomorphism over $X\setminus D$ , and denote $E=(f^*D)_{\mathrm {red}}$ . A birational definition is given for Hodge ideals in [Reference Mustaţă and PopaMP19a, §9]. In this section, we give a similar equivalent definition for weighted Hodge ideals. For the rest of this section, we use right $\mathscr {D}$ -modules as it is more convenient for the construction. Recall that the right $\mathscr {D}_X$ -module corresponding to $\mathscr {O}_X(*D)$ is $\omega _X(*D)$ , and
Consider the following complex which we denote by $A^{\bullet }$ :
placed in degrees $-n, \ldots , 0$ . The results in [Reference Mustaţă and PopaMP19a, §3] say that the complex $A^{\bullet }$ represents the object $\omega _Y(*E)\overset {\mathbf {L}}{\otimes }_{\mathscr {D}_Y}\mathscr {D}_{Y\to X}$ in the derived category of filtered right $f^{-1}\mathscr {D}_X$ -modules. Moreover, $R^0f_*A^{\bullet } \cong \omega _X(*D)$ .
For $p\geq 0$ , define the subcomplex $C^{\bullet }_{p-n}= F_{p-n}A^{\bullet }$ of $A^{\bullet }$ by
The pushforward of this complex admits the following interpretation:
by [Reference Mustaţă and PopaMP19a, Remark 9.3], Corollary 12.1.
We prove similar results in order to obtain a birational definition. Consider the complex $B^{\bullet }$ :
in degrees $-n,\ldots ,0$ , where the map
is given by $\omega \otimes P \to d\omega \otimes P + \sum {(dz_i\wedge \omega )\otimes \partial _i P}$ . The complex $B^{\bullet }$ is filtered quasi-isomorphic to the object $\omega _Y(*E)$ in degree 0 [Reference Mustaţă and PopaMP19a, Proposition 3.1].
Proposition 4.1. The complex
in degrees $-n,\ldots , 0$ is quasi-isomorphic to $W_{n+l}\omega _Y(*E)$ .
Proof. We see first that the complex $W_lB^{\bullet }$ is exact in degrees $-n, \ldots , -1$ . Fix a degree $-p$ . We need to see that
is exact. Let $x\in X$ be a point and $\{z_1, \ldots , z_n\}$ be a set of coordinates in an open neighborhood around the point. We localize at x, take the completion and identify the completion of $\mathscr {O}_{X,x}$ with . Let $\eta \in \ker {\hat {b}}$ . By exactness of $B^{\bullet }$ , there exists $\omega $ in the completion of $\Omega _Y^{n-p-1}(\log {E})\otimes \mathscr {D}_Y$ such that $d'\omega = \eta $ (we keep calling $d'$ the differentials of this complex). We can write $\omega = \sum {g_{I, J, \alpha } \frac {dz_I}{z_I}\wedge dz_J \otimes \partial ^{\alpha }}$ , with , since every element $P \in \mathscr {D}_Y$ can be written as $P = \sum {g_{\alpha }\partial ^{\alpha }}$ . Moreover, expanding each $g_{I, J, \alpha }$ , we can write
so that no $z_i$ that appears in $z_I$ divides $C^{\beta }_{I,J,\alpha }z^{\beta }$ . From this description, it follows that for each summand $C^{\beta }_{I,J,\alpha }z^{\beta } \frac {dz_I}{z_I}\wedge dz_J \otimes \partial ^{\alpha }$ , $|I|$ determines the weight where the form $C^{\beta }_{I,J,\alpha }z^{\beta } \frac {dz_I}{z_I}\wedge dz_J$ lies.
Next, we write, $\omega = \omega _{\leq l} + \omega _{>l}$ , where the first term consists of the summands with $|I|\leq l$ , and the latter of the terms with $|I|>l$ . Using the description of $d'$ , we see that $d'\omega _{\leq l}$ is in the completion of $W_l\Omega _Y^{n-p}(\log {E})\otimes \mathscr {D}_Y$ , and each summand of $d'\omega _{>l}$ is not. Indeed,
Since $\eta \in \ker {\hat {b}}$ , $d'\omega _{>l} = 0$ , and $d'\omega _{\leq l} = \eta $ , with $\omega _{\leq l}$ in the completion of $W_l\Omega _Y^{n-p-1}(\log {E})\otimes \mathscr {D}_Y$ .
Consider now the map,
given by $\frac {\omega }{f}\otimes P \to \frac {\omega }{f}\cdot P$ . Fixing a degree of the Hodge filtration and using the description of the Hodge filtration of $W_{n+l}\omega _Y(*E)$ (see, for example, Proposition 3.3), we see that this map is surjective. That the kernel is the image of $W_l\Omega ^{n-1}_Y(\log {E})\otimes _{\mathscr {O}_Y} \mathscr {D}_Y$ follows from [Reference Mustaţă and PopaMP19a, Proposition 3.1] and an argument similar to the one above.
Consider next the complex
We have that $W_lA^{\bullet } = W_lB^{\bullet }\otimes _{\mathscr {D}_Y}\mathscr {D}_{Y\to X}$ , where $\mathscr {D}_{Y\to X}= \mathscr {O}_Y\otimes _{f^{-1}\mathscr {O}_X}f^{-1}\mathscr {D}_X$ is the transfer module. Note that when we see it as an $\mathscr {O}_Y$ module, we simply write $f^*\mathscr {D}_X$ .
Lemma 4.2. The complex $W_lA^{\bullet }$ represents $W_{n+l}\omega _Y(*E) \overset {\mathbf {L}}{\otimes }_{\mathscr {D}_Y} \mathscr {D}_{Y\to X}$ in the derived category of filtered right $f^{-1}\mathscr {D}_X$ -modules.
Proof. It is enough to show that the elements $W_lB^k$ are acyclic with respect to $-\otimes _{\mathscr {D}_Y}\mathscr {D}_{Y\to X}$ . For any k consider the following spectral sequence:
[Reference WeibelWei94, Theorem 5.6.6]. As $\mathscr {D}_Y$ is a locally free $\mathscr {O}_Y$ -module, then $E_2^{p,q}=0$ for $q\neq 0$ . Therefore,
for $p\neq 0$ , where the last equality follows from the fact that $f^*\mathscr {D}_X$ is locally free.
The map
is precisely the morphism
whose image is $W_{n+l}\omega _X(*D)$ . Moreover, the complex $C_{p-n}^{\bullet }$ described above corresponds to the $F_{p-n}(\omega _Y(*E)\overset {\mathbf {L}}{\otimes }_{\mathscr {D}_Y} \mathscr {D}_{Y\to X})$ using the identification
By strictness, there is an injective map
whose image is $F_{p-n}\omega _X(*D) = I_p(D) \otimes \omega _X((p+1)D)$ (see [Reference Mustaţă and PopaMP19a, Sections 4, 9, and 12]).
Similarly, we define $C^{\bullet }_{l,p-n}$ by
which corresponds to $F_{p-n}(W_{n+l}\omega _Y(*E)\overset {\mathbf {L}}{\otimes }_{\mathscr {D}_Y} \mathscr {D}_{Y\to X})$ under the identification
given by Lemma 4.2.
Proposition 4.3. Using the notation above,
Proof. By strictness, we have an injective map
whose image is $F_{p-n}H^0f_+W_{n+l}\omega _X(*D)$ (see for instance [Reference Mustaţă and PopaMP19a, §4]). Taking the composition
and using strictness in the middle morphism (since it underlies a morphism of mixed Hodge modules), the image corresponds to $F_{p-n}W_{n+l}\omega _X(*D) = I^{W_l}_p(D) \otimes \omega _X((p+1)D).$
The description in Proposition 4.3 for $I_0^{W_l}(D)$ coincides with the description in [Reference OlanoOla22, Proposition 3] since $f_*W_l\omega _Y(E) \to f_*\omega _Y(E)$ is an inclusion. The complex $C^{\bullet }_{l,1-n}$ also has a simple description. Recall that by definition
in degrees -1 and 0. Moreover, the map
is injective [Reference Mustaţă and PopaMP19a, Lemma 3.4]. Using the fact that $W_l\Omega ^{n-1}_Y(\log {E}) \hookrightarrow \Omega ^{n-1}_Y(\log {E})$ and $W_l\omega _Y(E)\otimes f^*F_1\mathscr {D}_X \hookrightarrow \omega _Y(E)\otimes f^*F_1\mathscr {D}_X$ are injective (since $F_1\mathscr {D}_X$ is a locally free $\mathscr {O}_X$ -module), we obtain that the differential in $C^{\bullet }_{l,1-n}$ is also an inclusion. Let $\mathcal {F}_{l,1}$ be the cokernel. This means that
This map can be interpreted by using the complex $C^{\bullet }_{1-n}$ . Indeed, let $\mathcal {F}_1$ be the cokernel of the differential in $C^{\bullet }_{1-n}$ . We have an induced map $\mathcal {F}_{l,1} \to \mathcal {F}_1$ . Since $f_*\mathcal {F}_1 = I_1(D)\otimes \omega _X(2D)$ ,
Note that, since weighted Hodge ideals were defined in terms of the Hodge and weight filtrations of $\mathscr {O}_X(*D)$ , the constructions presented in this section are independent of the resolution of singularities.
5 Weighted Hodge ideals and V-filtration
Let X be a smooth variety and D be an effective reduced divisor defined by the global equation $f\in \mathscr {O}_X(X)$ . The Hodge ideals $I_p(D)$ can be described using the V-filtration of $i_+\mathscr {O}_X$ , where i is the graph embedding defined by f. Namely,
where $Q_j(x) = \prod _{i=0}^{j-1}(x+i)$ , [Reference Mustaţă and PopaMP20b, Theorem A’]. An equivalent description is obtained using the following map:
given by
The map $\tau $ Footnote 1 is a surjective morphism of $\mathscr {D}_X$ -modules, and
see [Reference Mustaţă and PopaMP20a, Proposition 5.4 and Lemma 5.1]. Moreover, the map $\tau $ induces a map
Indeed, it is enough to see that $\tau (V^{>1}i_+\mathscr {O}_X ) \subseteq \mathscr {O}_X$ . This follows from the fact that $V^{>1}i_+\mathscr {O}_X = V^{1+\alpha }i_+\mathscr {O}_X = t\cdot V^{\alpha }i_+\mathscr {O}_X$ , with $\alpha>0$ , and that if $j>0$ , $tu\partial _t^j\delta = fu\partial _t^j\delta - ju\partial _t^{j-1}\delta $ , and $tu\delta = fu\delta $ . For $v=\sum _{j=0}^p v_j\partial _t^j\delta \in V^{>1}i_+\mathscr {O}_X$ , there exists $u = \sum _{j=0}^p u_j\partial _t^j\delta \in V^{\alpha }i_+\mathscr {O}_X$ such that, $tu = v$ . Hence,
as
because $Q_j(1) = jQ_{j-1}(1)$ .
The $\mathscr {D}_X$ -module $\operatorname {\mathrm {gr}}^1_Vi_+\mathscr {O}_X$ underlies the mixed Hodge module $\psi _{f,1}\mathscr {O}_X$ and its weight filtration can be described in terms of the nilpotent operator $t\partial _t$ . In order to complete the description in Theorem 5.6, we first need to show that the map $\bar {\tau }$ also preserves the weight filtration.
Proposition 5.3. The map $\bar {\tau }$ sends the weight and Hodge pieces to the same image as the map $\tau _{\mathscr {D}_X}$ that underlies a morphism of mixed Hodge modules
Proof. The map $\bar {\tau }$ is surjective and using its description, we observe that its kernel is the image of the map $\partial _t t -1$ on $\operatorname {\mathrm {gr}}^1_Vi_+\mathscr {O}_X$ . The same is true for the map $\tau _{\mathscr {D}_X}$ . Indeed, the map $\partial _t t -1$ underlies the composition $Var\circ can$ on $\psi _{f,1}\mathscr {O}_X$ . As $can: \psi _{f,1}\mathscr {O}_X \to \phi _{f,1}\mathscr {O}_X$ is surjective because $i_+\mathscr {O}_X$ has strict support (see, for instance, [Reference SchnellSch14, §11]), the cokernel of $Var\circ can$ coincides with the cokernel of
The cokernel of $Var$ is isomorphic to $i_{D*}\mathcal {H}^1i_D^!\mathscr {O}_X$ , where $i_D: D \to X$ is the inclusion [Reference SaitoSai90, Corollary 2.24]. Moreover, $i_{D*}\mathcal {H}^1i_D^!\mathscr {O}_X$ is isomorphic to $\mathcal {H}^1_D(\mathscr {O}_X)$ [Reference SaitoSai09, §2.2]. This means that $\bar {\tau }$ and $\tau _{\mathscr {D}_X}$ could only differ by a $\mathscr {D}_X$ -automorphism of $\mathcal {H}^1_D(\mathscr {O}_X)$ and the result is a consequence of Lemma 5.4.
Lemma 5.4. A $\mathscr {D}_X$ -automorphism of $\mathcal {H}^1_D(\mathscr {O}_X)$ preserves the Hodge and weight filtration.
Proof. We can restrict to an open affine subset. Let $X = \operatorname {\mathrm {Spec}}{R}$ , where D is defined by $f\in R$ , and $\varphi $ an $\mathscr {D}_R$ -automorphism of $R_f/R$ . Let $m\geq 2$ , then $\varphi [\frac {1}{f^m}] = [\frac {g_m}{f^m}]$ for some $g_m\in R$ , since $f^m \varphi [\frac {1}{f^m}] = 0$ . Using that $\varphi $ is $\mathscr {D}_R$ -linear, we see that for every $T\in Der_{\mathbb {C}}(R)$ , $T(g_m)\in (f^{m-1})$ . This implies that around each smooth point of $P\in D$ , using a regular system of parameters, we have an h such that $h(P)\neq 0,$ and $g_m - g_m(P) \in f^m\cdot R_h$ . Restricting the automorphism to the open set defined by h, we see that $\varphi _h$ acts by multiplying by a constant. This means that this constant doesn’t depend on m, and after restricting to double intersections, we see that this constant doesn’t depend on the point. Let $\lambda $ be the constant. Since $\varphi - \lambda \cdot Id$ is 0 on all the smooth points, $\varphi = \lambda \cdot Id$ everywhere. In particular, $\varphi $ preserves the Hodge and the weight filtration.
We are very grateful to Mircea Mustaţă for suggesting the argument of Lemma 5.4.
Remark 5.5. A simpler proof of the Lemma was suggested by a referee. Using the Riemann–Hilbert correspondence and Verdier duality, it is enough to verify the conclusion of the Lemma on the perverse sheaf $\mathbb {Q}_D[n-1]$ . We leave the original proof to have an argument using only $\mathscr {D}$ -modules.
A consequence of the result above is that we can write a description of the weighted Hodge ideals in a similar way to equation (5.1). Let $W_lV^1i_+\mathscr {O}_X$ be the submodule of $V^1i_+\mathscr {O}_X$ which maps to $W_{n+l-2}\operatorname {\mathrm {gr}}^1_Vi_+\mathscr {O}_X$ via the canonical projection.
Proposition 5.6. Using the notation above,
Proof. It follows from Proposition 5.3 that $\tau (F_{p+1}W_lV^1i_+\mathscr {O}_X)=F_pW_{n+l}\mathscr {O}_X(*D)= I_p^{W_l}(D)\otimes \mathscr {O}_X((p+1)D).$
The result above can be simplified even more using the description of the weight filtration of $\psi _{f,1}\mathscr {O}_X$ , and that is the statement of Theorem A.
Proof of Theorem A
First, we note that if $v\in V^1i_+\mathscr {O}_X$ , then $\tau (t\partial _t v) = 0$ . Indeed, let $v=\sum _{j=0}^p v_j\partial _t^j\delta \in V^{1}i_+\mathscr {O}_X$ , then
and
The weight filtration of $\psi _{f,1}\mathscr {O}_X$ admits the following description for $k\geq 0$ :
(see [Reference SaitoSai94, 2.7] and for the monodromy filtration see, for example, [Reference Steenbrink and ZuckerSZ85, Remark 2.3]). The only piece that is not an image of $(t\partial _t)$ is $\ker {(t\partial _t)^{k+1}}$ . That means that the subset $\ker {(t\partial _t)^{l}}\subseteq W_lV^1i_+\mathscr {O}_X$ has the same image as $W_lV^1i_+\mathscr {O}_X$ via $\tau $ .
Remark 5.7. Let $(X,D)$ be a pair such that D has at most isolated weighted homogeneous singularities. Theorem A gives a complete description of the weighted Hodge ideals using the description of the V-filtration in [Reference SaitoSai09]. Using the notation above, in this case, $(t\partial _t)^2u\in V^{>1}i_+\mathscr {O}_X$ for all $u\in V^1i_+\mathscr {O}_X$ . For this reason, $I_p^{W_2}(D) = I_p(D)$ , for all $p\geq 0$ . An argument without the use of the V-filtration in the case of $p=0$ is described in [Reference OlanoOla22, §10].
A direct application of Theorem A is that we can recover the following result proved in [Reference Mustaţă and PopaMP19a, Theorem C]. The proof we give differs from the one in [Reference Mustaţă and PopaMP19a] and is also much shorter.
Corollary 5.8. Let X be a smooth variety and D an effective reduced divisor. Then
for all $p\geq 1$ .
Proof. Recall that $\operatorname {\mathrm {adj}}(D) = I_0^{W_1}(D)$ [Reference OlanoOla22, Theorem A]. Moreover, as $I_p(D) \subseteq I_1(D)$ [Reference Mustaţă and PopaMP19a, Proposition 13.1], it is enough to prove that $I_1(D)\subseteq I_0^{W_1}(D).$
Let $u\in I_1(D)$ . By equation (5.1), $u = u_0f + u_1$ , where f is defining equation of D, and $u_0\delta + u_1\partial _t\delta \in V^1i_+\mathscr {O}_X$ . We also have that
and
Finally, as $\delta \in V^{>0}i_+\mathscr {O}_X$ , then $u_0f\delta = t(u_0\delta )\in V^{>1}i_+\mathscr {O}_X\subseteq W_1V^1i_+\mathscr {O}_X$ . This means that $u_0f\delta + u_1\delta \in W_1V^1i_+\mathscr {O}_X$ , hence $u_0f +u_1 \in I_0^{W_1}(D).$
There is a relation between the minimal exponent of f and the weighted Hodge ideals. Recall that if we denote $b_f(s)$ the Bernstein–Sato polynomial, and $\widetilde {b}_f(s)$ the reduced one, we call $\widetilde {\alpha _f}$ the negative of the largest root of $\widetilde {b}_f(s)$ . Saito proved in [Reference SaitoSai16] that $I_p(D) = \mathscr {O}_X$ if and only if $\widetilde {\alpha _f} \geq p+1$ (c.f. [Reference Mustaţă and PopaMP20b, Corollary 6.1]). Moreover, this result also holds in the case of $\mathbb {Q}$ -divisors, and it can be stated in the following form.
Lemma 5.9 ([Reference Mustaţă and PopaMP20a, Lemma 1.2])
For an integer p and $\alpha \in (0,1]$ ,
Using these ideas, we obtain the following result for the 1st weighted Hodge ideals.
Corollary 5.10. Using the notation above,
Proof. Suppose first that $\widetilde {\alpha _f}> p+1$ . Then, by Lemma 5.9, $\partial _t^p\delta \in V^1i_+\mathscr {O}_X$ . Moreover, there exists $\alpha \in (0,1]$ such that $\widetilde {\alpha _f} \geq p+1+\alpha $ . Again, by Lemma 5.9, $\partial _t^{p+1}\delta \in W_1V^1i_+\mathscr {O}_X$ , and therefore, $I_p^{W_1}(D) = \mathscr {O}_X$ .
Suppose now that $I_p^{W_1}(D) = \mathscr {O}_X$ . Then, $I_p(D) = \mathscr {O}_X$ , and in particular $\delta , \partial _t\delta , \ldots , \partial _t^p\delta \in V^1i_+\mathscr {O}_X$ . Moreover, there exists $v = \sum _{j=0}^p v_j\partial _t^j\delta \in W_1V^1i_+\mathscr {O}_X$ such that $\sum _{j=0}^p Q_j(1)f^{p-j}v_j = 1$ . It is enough to show that $\partial _t^p\delta \in W_1V^1i_+\mathscr {O}_X$ . Indeed, by Proposition 5.6 and the injectivity of $t: \operatorname {\mathrm {gr}}_V^0i_+\mathscr {O}_X \to \operatorname {\mathrm {gr}}_V^1i_+\mathscr {O}_X$ (see, e.g., [Reference SchnellSch14, §11]), this means that $\partial _t^{p+1}\delta \in V^{\alpha }i_+\mathscr {O}_X$ with $\alpha \in (0,1]$ , and therefore, $\widetilde {\alpha _f} \geq p+1+\alpha> p+1$ . We argue by induction. Suppose $p=0$ . Then $v=v_0\delta $ and by the second condition, $v_0 = 1$ . Hence, $\delta \in W_1V^1i_+\mathscr {O}_X$ . By the induction hypothesis, we assume now that $\partial _t^k\delta \in W_1V^1i_+\mathscr {O}_X$ for $k=0, \ldots , p-1$ . It follows from the description of v that
and then
The result follows if we show that $f\partial _t^p\delta \in W_1V^1i_+\mathscr {O}_X$ , and this is a consequence of $f\partial _t^p\delta = t\partial _t(\partial _t^{p-1}\delta ) + p\partial _t^{p-1}\delta \in W_1V^1i_+\mathscr {O}_X$ .
Remark 5.11. In general, we cannot obtain more information about the other p-weighted Hodge ideals. In [Reference OlanoOla22, §13], the case of isolated log-canonical singularities, that are not rational, is discussed. This case corresponds to $\widetilde {\alpha _f} = 1$ . By the discussion above, it is clear that $I_0(D) = \mathscr {O}_X$ and that $I_0^{W_1}(D)$ is not trivial. For $l = 2,\ldots , n-1$ , there are examples of f where the weighted multiplier ideals $I_0^{W_l}(D)$ are trivial and other examples where they are nontrivial [Reference IshiiIsh85, Theorem 5.2].
D Local study
6 Measuring the difference between weighted Hodge ideals
There is a short exact sequence that arises from the definition of the weight filtration on $\mathscr {O}_X(*D)$ :
Applying $F_p$ , we obtain the short exact sequence
When D has at most isolated singularities and $l\geq 2$ , $\operatorname {\mathrm {gr}}^W_{n+l}\mathscr {O}_X(*D)$ is supported on the singular points. To simplify the notation, we use the following definition.
Definition 6.2. Suppose D has at most one isolated singularity $x\in D$ , and let $i_x:\{x\}\hookrightarrow X$ . For $l\geq 2$ , we denote by $H_l$ the complex pure Hodge structure of weight $n+l$ such that
In order to describe the dimension of $F_p(i_{x})_+H_l$ , it is enough to describe the dimension of $\operatorname {\mathrm {Gr}}_F^{n-k}H_l$ for $0\leq k\leq p$ . This is a consequence of the local description of the Hodge filtration of $(i_{x})_+H_l$ . Let $x_1, \ldots , x_n$ be a set of coordinates around the point $x\in X$ . We have the following description of the pushforward of $H_l$ as a $\mathscr {D}$ -module:
where $\partial _i = \frac {\partial }{\partial _{x_i}}$ , and
where $\partial ^{\nu } = \partial _1^{\nu _1}\cdots \partial _n^{\nu _n}$ , $|\nu | = \nu _1+\ldots +\nu _n$ and $F_kH_l = F^{-k}H_l$ . Since the lowest degree of the Hodge filtration of $\mathscr {O}_X(*D)$ is 0, and $\operatorname {\mathrm {DR}}((i_{x})_+H_l) \cong (i_{x})_*H_l$ , that is, the pushforward of the pure Hodge structure $H_l$ is a skyscraper sheaf, then the highest degree of the Hodge filtration of $H_l$ is n, in other words, $F^{n+1}H_l = 0$ . Using this, we obtain, for instance, that
and
Since $F_p(i_{x})_+H_l$ is a skyscraper sheaf, we denote by $\dim (F_p(i_{x})_+H_l)$ the dimension of the complex vector space $J_p$ that satisfies $F_p(i_{x})_+H_l = (i_{x})_*J_p$ . From the discussion above, we obtain that
and in general
The dimension of $\operatorname {\mathrm {Gr}}_F^{n-k}H_l$ is described in Theorem B.
Proof of Theorem B
We can and will assume that X is a projective variety. Indeed, there is an open set around x which has a smooth projective compactification $\bar {X}$ . Let $\bar {D}$ be the closure of D in $\bar {X}$ . Consider a log-resolution of $(\bar {X}\smallsetminus x, \bar {D}\smallsetminus x)$ given by a sequence of blow ups with centers over the singular locus of $\bar {D}\smallsetminus x$ . By blowing up the same sequence of centers over $\bar {X}$ , we obtain a map $X_1\to \bar {X}$ . Let $D_1$ be the strict transform of $\bar {D}$ . By construction, the map is an isomorphism over $(X,D)$ , and $D_1$ has only one isolated singularity corresponding to $x\in D$ . We replace $(X,D)$ with $(X_1,D_1)$ .
First, we prove that these dimensions do not depend on the log-resolution of singularities that is an isomorphism outside of $\{x\}$ . Since for a pair of resolution of singularities one can find a third one that dominates the two of them, it is enough to show that the dimensions are equal if we have two resolutions of singularities $g_1:D_1\to D$ and $g_2:D_2\to D$ such that there is a morphism $h:D_1\to D_2$ such that $g_1 = g_2\circ h$ . Let $G_i\subseteq D_i$ be the exceptional divisor of $g_i$ . Consider the exact sequence of mixed Hodge structures
(see [Reference Peters and SteenbrinkPS08, Proof of Theorem 6.15]). For $l\geq 3$ , applying $H^{p,n-l-p}$ , we obtain that
For $l=2$ , applying $H^{p,n-p-2}$ and $H^{n-p-1,p+1}$ and noting that $h^{p,n-p-2}(D_i) = h^{n-p-1,p+1}(D_i)$ , we obtain that
Let $f:Y\to X$ be a log-resolution that is an isomorphism outside of x, and $E:=f^{-1}(D)_{red}$ . This resolution defines a log-resolution of singularities $g: \widetilde {D}\to D$ by restriction, that is an isomorphism outside of x. We use the spectral sequence (1.3) for the constant map from X to a point. In this case, it says
noting that $\operatorname {\mathrm {DR}}(\mathscr {O}_X(*D)) \cong \textbf {R}j_*\mathbb {C}_U[n]$ , where $j:U = X\smallsetminus D\hookrightarrow X$ . We also have the isomorphism
Consider the maps
corresponding to
Moreover, the degeneration of the Hodge-to-de-Rham spectral sequence says that
(see, for example, [Reference Mustaţă and PopaMP19a, Example 4.2]).
Consider first the case $l\geq 3$ . Noting that $\mathbb {H}^{i}(X, \operatorname {\mathrm {DR}}((i_{x})_+H_l)) = 0$ if $i\neq 0$ for $l\geq 2$ , we obtain that
Applying $\operatorname {\mathrm {gr}}^F_{-n+p}$ , using equation (6.7), and the $E_2$ -degeneration of the spectral sequence, we obtain that
where the last isomoprhism follows from Poincaré duality (see [Reference Peters and SteenbrinkPS08, Theorem 6.23]). Using the long exact sequence of the pair $(X,D)$ , we obtain that
as $H^{n-1}(X)$ and $H^n(X)$ have pure Hodge structures. Finally, as g has $\{x\}$ as discriminant, we have a long exact sequence,
As this is a sequence of mixed Hodge structures, we obtain
Consider now $l=2$ . In this case, the maps
correspond to
Indeed, the first two terms follow from the explanation above. The third term follows from the fact that $\operatorname {\mathrm {DR}}(\operatorname {\mathrm {gr}}^W_{n+1}\mathscr {O}_X(*D)) \cong IC_D(-1)$ , a Tate twist of the intersection complex of D [Reference SaitoSai09, §2.2]. Furthermore, $IH^n(D) \cong H^n(D)$ [Reference Goresky and MacPhersonGM80, §6.1]. The last term in the complex, follow as $\operatorname {\mathrm {DR}}(\operatorname {\mathrm {gr}}^W_{n}\mathscr {O}_X(*D)) \cong \mathbb {C}_X[n].$ From the short exact sequence
where $\beta = \operatorname {\mathrm {gr}}^F_{-n+p}\widetilde {\beta }$ and $\gamma = \operatorname {\mathrm {gr}}^F_{-n+p}\widetilde {\gamma }$ , we obtain that
Indeed, this follows from the descriptions of $E_2^{n-2+s, n+2}$ for $s=0,1,2$ and Poincaré duality. More precisely, we have three short exact sequences
and also that $\operatorname {\mathrm {Gr}}_F^{n-p}E_2^{n-1,n+2}\cong H^{p,n-p-2}(H^{n-1}_c(U))^*$ . Using the long exact sequence associated to the pair $(X,D)$ to relate these three sequences, we obtain
Finally, using that the map g has $\{x\}$ as discriminant, we obtain that
Remark 6.8. In general, the term $h^{n-p-1, p+1}(H^n(G))$ might not be 0. Consider for instance $n=4$ and $p=1$ . In this case, $h^{2,2}(H^4(G)) = k$ , where k is the number of irreducible components of G. Using similar computations as above, we also see that
that is, the failure of Poincaré duality. Still, in the case $p=0$ , the term $h^{n-p-1, p+1}(H^n(G))$ is always 0, as G is $(n-2)$ -dimensional (see [Reference OlanoOla22, Theorem B]).
E Vanishing theorems
7 Ample divisors
Let X be a smooth projective variety of dimension n, and D an ample divisor. Let $U = X\smallsetminus D$ . As U is smooth and affine, $H^{i+n}(U) = 0$ for $i> 0$ (see, for instance, [Reference LazarsfeldLaz04, Theorem 3.1.1]). In this setting, we have the following result.
Lemma 7.1. There is a short exact sequence
Proof. In [Reference OlanoOla22, Proof of Proposition 12.1], using the spectral sequences
and
and noting that
we obtained:
-
(a) For $s\geq 1$ ,
$$\begin{align*}\operatorname{\mathrm{gr}}^W_{n+k+i-s}H^i(X, \operatorname{\mathrm{DR}}(W_{n+k}\mathscr{O}_X(*D))) \cong \operatorname{\mathrm{Gr}}^W_{n+k+i-s}H^{i+n}(U, \mathbb{C}).\end{align*}$$ -
(b) For $s\geq 1$ ,
$$\begin{align*}\operatorname{\mathrm{gr}}^W_{n+k+i+s}H^i(X, \operatorname{\mathrm{DR}}(W_{n+k}\mathscr{O}_X(*D))) = 0.\end{align*}$$ -
(c) Let
$$\begin{align*}\alpha_{k+1}: H^{i-1}(X, \operatorname{\mathrm{DR}}(\operatorname{\mathrm{gr}}^W_{n+k+1}\mathscr{O}_X(*D))) \to H^i(X, \operatorname{\mathrm{DR}}(\operatorname{\mathrm{gr}}^W_{n+k}\mathscr{O}_X(*D)))\end{align*}$$corresponding to the map $E^{-n-k-1, i+n+k}_1 \to E_1^{-n-k, i+n+k}$ . Then we have the following short exact sequence:
$$\begin{align*}0\to \operatorname{\mathrm{im}}{\alpha_{k+1}} \to \operatorname{\mathrm{gr}}^W_{i+n+k}H^i(X, \operatorname{\mathrm{DR}}(W_{n+k}\mathscr{O}_X(*D))) \to \operatorname{\mathrm{Gr}}^W_{i+n+k}H^{i+n}(U, \mathbb{C}) \to 0.\end{align*}$$
If $i\geq 1$ , then
Consider now the complex
As $E_2^{-n-l,n+l+i} = 0$ , using the analysis above, we obtain a short exact sequence
and the result follows.
When $p= 0$ , the result above is enough to obtain that
for $l\geq 2$ and $i\geq 1$ . Indeed, as 0 is the lowest degree of the Hodge filtration on $\mathscr {O}_X(*D)$ , we have
This is no longer the case when we consider $\operatorname {\mathrm {gr}}^F_{-n+p}$ for $p\geq 1$ instead. Nonetheless, following the idea in [Reference Mustaţă and PopaMP19a, Proof of Theorem F], we give conditions in Theorem C to obtain an analogue vanishing theorem.
Proof of Theorem C
Since $I_{p-1}^{W_l}(D) = \mathscr {O}_X$ , we have the following short exact sequence
Using the long exact sequence of cohomologies and Kodaira vanishing, we note that it is enough to prove that
Consider now the complex
The complex $C^{\bullet }$ can be identified with the complex
concentrated in degrees $-p$ to $0$ , since $F_0W_{n+l}\mathscr {O}_X(*D) = \mathscr {O}_X(D)$ and $\operatorname {\mathrm {gr}}^F_kW_{n+l}\mathscr {O}_X(*D) \cong \mathscr {O}_D((k+1)D)$ for $k\leq p-1$ (see §1 for the definition of $\operatorname {\mathrm {gr}}^F_p\operatorname {\mathrm {DR}} )$ .
Suppose now that D has at most isolated singularities. By Lemma 7.1, we obtain that
for $i\geq 1$ and $l\geq 2$ . In particular, this means that
for the same indices, by the Hodge-to-de-Rham degeneration. Next, we use the exact sequence
Note that
Since
then $E_1^{-1, q} = 0$ if $q\geq 2$ by Nakano vanishing. Moreover, $E_1^{-1,1} = 0$ by our hypothesis.
We continue with a similar analysis in the higher pages of the spectral sequence. More precisely, we show that the hypothesis implies that $E_r^{-r, q+r-1} = 0$ for all $r\geq 2$ . Note that this is enough to complete the proof. Indeed, if this is the case, we obtain that
for $q\geq 1$ , where the last equality follows from the established equality with $C^{\bullet }$ .
To complete the proof, note that
for $r\geq p$ . Indeed, this is clear for the strict inequality by the degrees on which $C^{\bullet }$ is concentrated, and
If $q\geq 2$ , then this spaces vanishes by Nakano vanishing, and if $q=1$ , it vanishes by our assumption. Finally, for $r\leq p-1$ , we have
This space fits the a long exact sequence
If $q\geq 2$ , then the two other terms vanish by Nakano vanishing, and if $q = 1$ , they vanish by the assumption.
Remark 7.2. This result does not hold in general for $l = 1$ (see [Reference OlanoOla22, Remark 9]).
8 Kodaira-type vanishing
Using a similar idea to the one in the proof of Theorem C, we obtain a vanishing theorem for weighted Hodge ideals. This is the analogue result to [Reference Mustaţă and PopaMP19a, Theorem F].
Proposition 8.1. Let X be a smooth projective variety of dimension n, and D a reduced effective divisor. Let L be a line bundle such that $L(kD)$ is ample for $0\leq k\leq p$ , and assume $I_{p-1}^{W_1}(D)$ is trivial. Then
-
1. For $l\geq 1$ and $i\geq 2$ ,
$$\begin{align*}H^i(X, \omega_X((p+1)D) \otimes L \otimes I_p^{W_l}(D))= 0.\end{align*}$$ -
2. If $H^j(X, \Omega _X^{n-j} \otimes L((p-j+1)D)) = 0$ for all $1\leq j\leq p$ , then
$$\begin{align*}H^1(X, \omega_X((p+1)D) \otimes L \otimes I_p^{W_l}(D))= 0\end{align*}$$for $l\geq 1$ .
Proof. Since $I_{p-1}^{W_l}(D) = \mathscr {O}_X$ , we have the following short exact sequence
By Kodaira vanishing, it is enough to prove
We have that
for $i\geq 1$ and $l\geq 1$ as a consequence of a vanishing result by Saito [Reference SaitoSai90, Proposition 2.33]. To complete the proof, we use the same spectral sequence as in the proof of Theorem C.
9 Applications
In this section, we combine the local study and the vanishing results. To obtain applications, we use the vanishing theorems of the previous sections. A class varieties where the vanishing condition in Theorem C and Proposition 8.1 is satisfied, is toric varieties. In this case, the Bott–Danilov-Steenbrink vanishing theorem says that if A is an ample line bundle on the toric variety X, then
for $j\geq 0$ and $i\geq 1$ (see, e.g., [Reference MustaţăMus02, Theorem 2.4]). For the applications, we discuss the case of $X=\mathbb {P}^n$ . We start with the proof of Corollary D.
Proof of Corollary D
Consider the exact sequence
The result follows from passing to cohomology and applying Theorem C.
9.1 Isolated p-log-canonical singularities
Suppose the pair $(X,D)$ is p-log-canonical and has at most isolated singularities. If $p=0$ , the pair is log-canonical and in this case, $I_0^{W_1}(D)$ is the maximal ideal at each isolated singularity that is not rational by a result of Ishii (see [Reference OlanoOla22, §5.3]). For simplicity, let $x\in D$ be the only singularity and $i:\{x\}\hookrightarrow X$ the inclusion, and suppose that it is log-canonical singularity and not rational. The result above means that if we denote
for $l\geq 2$ , there exists exactly one degree l such that $\dim (\operatorname {\mathrm {gr}}^F_{-n}H_l) = 1$ , and the rest are 0. In this case, using [Reference OlanoOla22, Theorem B], we say that the singularity is of type $(0,n-l)$ [Reference IshiiIsh85, Definition 4.1]. There is a similar picture for the cases $p\geq 1$ we describe next.
Nonrational log-canonical singularities correspond to the case where the minimal exponent at the singularity is 1. We then consider singularities with minimal exponent $p+1$ , in which case $I_p(D) = \mathscr {O}_X$ and $I_p^{W_1}(D)$ is nontrivial by Corollary 5.10. These singularities generalize the example of nonrational log-canonical singularities in the following sense.
Proposition 9.1. Suppose D has at most one isolated singularity $x\in D$ , and $\widetilde {\alpha _D} = p+1$ . Then,
the maximal ideal of x in X.
Proof. Suppose that D is defined by $f\in \mathscr {O}_X$ . Recall from the proof of Corollary 5.10, that as $\widetilde {\alpha _f} = p+1$ , then $\delta , \partial _t\delta , \ldots , \partial _t^p\delta \in V^1B_f$ . Moreover, we also know that $\delta , \partial _t\delta , \ldots , \partial _t^{p-1}\delta \in W_1V^1B_f$ . It is then enough to show that $g\partial _t^p\delta \in W_1V^1B_f$ if and only if $g\in \mathfrak {m}_x$ . As D has an isolated singularity, we have that
for $\alpha <1$ [Reference Dimca and SaitoDS12, 4.11.1].
We also know that $\partial _t^p\delta \in V^1B_f\smallsetminus W_1V^1B_f$ , and this means that $\partial _t^{p+1}\delta \in V^0B_f\smallsetminus V^{>0}B_f$ . In particular, the class of $\partial _t^{p+1}\delta $ in $\operatorname {\mathrm {Gr}}^F_p\operatorname {\mathrm {gr}}_V^{0}B_f$ is not zero. Using the result above, for any $g\in \mathfrak {m}_x$ , the class of $g\partial _t^{p+1}\delta $ in $\operatorname {\mathrm {Gr}}^F_p\operatorname {\mathrm {gr}}_V^{0}B_f$ is zero. This means that $g\partial _t^{p+1}\delta \in V^{>0}B_f$ , and equivalently, $g\partial _t^p\delta \in W_1V^1B_f$ . Using the description of Theorem A, we obtain that $g\in I_p^{W_1}(D)$ for any $g\in \mathfrak {m}_x$ , and we know that the ideal is not trivial, hence we have an equality.
In other words, if D has one isolated singularity $x\in D$ , and $\widetilde {\alpha _D} = p+1$ , then
by Theorem B, that is, there is exactly one $l\geq 2$ such that
and the rest are 0. Moreover, by the same result, $\sum _{l\geq 2}{\dim (\operatorname {\mathrm {Gr}}_F^{n-r}H_l)} = 1$ , for $0\leq r\leq p-1$ .
Remark 9.2. Friedman and Laza have studied related invariants of singularities in similar conditions in [Reference Friedman and LazaFL22, Theorem 6.11 and Corollary 6.14].
Definition 9.3. Let $x\in D$ be an isolated singularity such that $\widetilde {\alpha _D}_x = p+1$ , that is an isolated p-log-canonical that is not p-rational. Let l be the degree such that $\dim (\operatorname {\mathrm {Gr}}_F^{n-p}H_l) =1$ . Then, we say that the singularity is of type $(p, n-l-p)$ .
Remark 9.4.
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i) Definition 9.3 is analogous to the definition of isolated log-canonical singularities of type $(0,s)$ [Reference IshiiIsh85, Definition 4.1], when $x\in D$ is an isolated singularity and D is a hypersurface of a smooth variety.
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ii) Ishii defined these singularities more generally for normal isolated 1-Gorenstein log-canonical singularities. It is an open question how to generalize this definition for nonhypersurface singularities.
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iii) The possible types are $(p,p), (p,p+1), \ldots (p,n-2-p)$ . This is a consequence of the fact that the nilpotency order of the vanishing cohomology is bounded by Briançon–Skoda exponent [Reference ScherkSch80, Main Theorem]. This nilpotency order gives a bound for the nilpotency order of $(\partial _t t)$ on $\operatorname {\mathrm {gr}}_V^0B_f$ , which in turn gives a bound for the order of $(t\partial _t)$ on $\operatorname {\mathrm {gr}}_V^1B_f$ . The Briançon–Skoda exponent is bounded by $n-2p -1$ (see, for instance, [Reference Jung, Kim, Saito and YoonJKSY22a]), which means that $n-l-p \geq p$ .
Example 9.5. Suppose that $f\in \mathbb {C}[x_1,\ldots ,x_n]$ is a polynomial with an isolated singularity at the origin and a nondegenerate Newton boundary. Let $\Gamma _+(f) = \Gamma $ the Newton polyhedron of f, $\Gamma (f)$ the union of the compact faces of $\Gamma _+(f)$ , and $\mathcal {F}$ the set of compact facets. For each $F\in \mathcal {F}$ , there is a unique vector $B_F\in (\mathbb {Q}_{\geq 0})^n$ such that $\langle A, B_F\rangle = 1$ for all $A\in F$ . For every monomial $x^{\nu }$ , we define
where $\mathbf {1} = (1,\ldots , 1)$ , and for any $g\in \mathscr {O}$ , $g=\sum g_Ax^A$ ,
Finally, we define
In this case, the minimal exponent is $\tilde {\rho }(1)$ .
Suppose $\widetilde {\alpha }_f = p+1$ , which implies that $\partial ^p_t\delta \in V^1i_+\mathscr {O}_X$ . Using the description of the microlocal V-filtration (see [Reference SaitoSai94, Proposition 3.2]), we see that if
then $(t\partial _t)^{r+1}\partial _t^p\delta \in V^{>1}i_+\mathscr {O}_X$ , or equivalently,
In general, $r+1$ is not the degree with $\operatorname {\mathrm {Gr}}_F^{n-p}H_l\neq 0$ .
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i) Weighted homogeneous singularities with $\widetilde {\alpha }_f=p+1$ are examples of singularities of type $(p,n-2-p)$ (see Remark 5.7). Isolated singularities with nondegenerate Newton boundary give examples for different degrees of l. For instance, $f = x^2 + y^2 + z^2 + u^2w^2 + u^4 + w^5\in \mathbb {C}^5$ satisfies that $\widetilde {\alpha _f} = 2$ , and $r=2$ , using the notation above. We can also verify that $(t\partial _t)^{2}\partial _t\delta \notin V^{>1}i_+\mathscr {O}_X$ since $w^5\partial _t^3\delta \in V^0\setminus V^{>0}$ . Indeed, this follows from the fact that $w^5\notin J(f)$ , where $J(f)$ is the Jacobian ideal, and [Reference Jung, Kim, Saito and YoonJKSY22b, Proposition 1.3]. Therefore, this singularity is of type $(1,1)$ .
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ii) Let $\Delta _0$ be the compact face that contains $\frac {1}{p+1}\mathbf {1}$ in its relative interior, and let $s=\dim {\Delta _0}$ . Assume also that the Newton polyhedron is simplicial. The number r defined above satisfies that $s = n - r$ . Let l be the degree such that $\operatorname {\mathrm {Gr}}_F^{n-p}H_l\neq 0$ . Then $l\leq r+1 = n-s+1$ , if $s>0$ , and $l\leq n$ is $s=0$ .
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iii) If $p=0$ , the previous inequalities are equalities (without the simplicial assumption) by a result of Watanabe that says that the singularities are log-canonical of type $(0,s-1)$ if $s>0$ , and $(0,0)$ if $s=0$ , which is equivalent to the equalities [Reference WatanabeWat87, Corollary 3.14].
Using Proposition 9.1 and the vanishing results, we obtain a bound on the number of these singularities in a hypersurface of $\mathbb {P}^n$ .
Corollary 9.6. Let D be a reduced hypersurface of $\mathbb {P}^n$ of degree d with at most isolated singularities. Assume that the pair $(\mathbb {P}^n, D)$ is strictly p-log-canonical, that is, $\widetilde {\alpha _D} = p+1$ . Let Z be the union of the strictly p-log-canonical singular points of D and $Z_2$ the union of those of type $(p,p), \ldots , (p, n-3-p)$ . Then,
and
F Restriction theorem
Let $(\mathcal {M}, F)$ be a filtered right $\mathscr {D}$ -module underlying a mixed Hodge module M on X. Let $H\subseteq X$ be a smooth hypersurface and $i:H\hookrightarrow X$ the inclusion. In this section, we change the notation of the V-filtration by $V_k = V^{-k}$ , which is the notation used in [Reference Mustaţǎ and PopaMP18]. There exists a canonical morphism
satisfying
with the filtrations induced by the filtrations on $\mathcal {M}$ (see [Reference Mustaţǎ and PopaMP18, §2]). Moreover, on an open set $U\subseteq X$ where H is given by a local equation t, this map corresponds to
between the vanishing and nearby cycles along H.
In the proof of [Reference Mustaţǎ and PopaMP18, Theorem A], the authors defined for all k a morphism
First, we define a morphism
such that for $u\in F_kV_{-1}\mathcal {M}$ , $\eta (u)$ is the class of u in $F_k\mathcal {M}\otimes _{\mathscr {O}_X}\mathscr {O}_H$ . This map is well defined, as on an open set U where H is defined by an equation t, the V-filtration satisfies
and $F_k\mathcal {M}\cdot t$ maps to 0 in $F_k\mathcal {M}\otimes _{\mathscr {O}_X}\mathscr {O}_H$ . The map $\eta $ induces a map on $F_k\mathcal {H}^1i^!\mathcal {M}$ . Indeed, since locally $\sigma $ is right multiplication by t, the image of $\sigma $ is mapped to 0 by $\eta \otimes \mathscr {O}_X(H)$ .
Proof of Theorem E
Let $\mathcal {M} = W_{n+l}\omega _X(*D)$ . For every k, we have the canonical morphism (9.8):
Note that the sheaf
Consider the short exact sequence
Applying the functor $i^!$ and taking cohomology, we obtain an exact sequence
as $\mathcal {H}^0i^!\omega _X(*D)=0$ . As $\operatorname {\mathrm {gr}}^W_i\mathcal {C} = 0$ for $i<n+l+1$ ,
and
by [Reference SaitoSai90, Proposition 2.26]. Therefore, we obtain a short exact sequence
Note that as
(see [Reference SchnellSch14, §23]), there is a split map
The source of this maps admits the following interpretation:
Indeed,
[Reference Mustaţǎ and PopaMP18, Proof of Theorem A].
Taking the corresponding piece of the Hodge filtration in equation (9.9) and composing it with equation (9.8), we obtain a morphism
Using the morphism above and switching k to $k-n$ , we obtain a map
and hence
Composing this map with $I_k^{W_l}(D)\otimes \mathscr {O}_H \to I_k^{W_l}(D)\cdot \mathscr {O}_H,$ we obtain a morphism
By construction, this map is compatible with restriction to open sets. Let $V=H\setminus D_H$ be the complement. When restricted to V, this map is the identity on $\mathscr {O}_V$ , and therefore it is an inclusion.
For the last statement, we note that a general H is in particular noncharacteristic with respect to $\omega _X(*D)$ . By the description of the V-filtration in this case [Reference SaitoSai88, Lemma 3.5.6], the map $\sigma $ is the zero map, and therefore equation (9.8) is a surjection. Moreover, in this case
where the first equality is the definition of $\mathcal {M}$ and the isomorphism is a result of Saito [Reference SaitoSai90, Lemma 2.25]. Hence, in this case equation (9.10) is an isomorphism.
Remark 9.11. A similar result can be obtained when H is an intersection of several general hyperplane sections. For more details, see [Reference OlanoOla22, Remark 12].
Acknowledgements
I would like to thank Mircea Mustaţă and Mihnea Popa for their constant support and many conversations during the project. I am also very grateful to the anonymous referee for their feedback on improving the presentation of the article and for suggesting of a simpler proof for Lemma 5.4, explained in Remark 5.5.
Competing interests
The authors have no conflicting interests to declare.