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We show that Miller partition forcing preserves selective independent families and P-points, which implies the consistency of $\mbox {cof}(\mathcal {N})=\mathfrak {a}=\mathfrak {u}=\mathfrak {i}<\mathfrak {a}_T=\omega _2$. In addition, we show that Shelah’s poset for destroying the maximality of a given maximal ideal preserves tight mad families and so we establish the consistency of $\mbox {cof}(\mathcal {N})=\mathfrak {a}=\mathfrak {i}=\omega _1<\mathfrak {u}=\mathfrak {a}_T=\omega _2$.
We study higher analogues of the classical independence number on
$\omega $
. For
$\kappa $
regular uncountable, we denote by
$i(\kappa )$
the minimal size of a maximal
$\kappa $
-independent family. We establish ZFC relations between
$i(\kappa )$
and the standard higher analogues of some of the classical cardinal characteristics, e.g.,
$\mathfrak {r}(\kappa )\leq \mathfrak {i}(\kappa )$
and
$\mathfrak {d}(\kappa )\leq \mathfrak {i}(\kappa )$
. For
$\kappa $
measurable, assuming that
$2^{\kappa }=\kappa ^{+}$
we construct a maximal
$\kappa $
-independent family which remains maximal after the
$\kappa $
-support product of
$\lambda $
many copies of
$\kappa $
-Sacks forcing. Thus, we show the consistency of
$\kappa ^{+}=\mathfrak {d}(\kappa )=\mathfrak {i}(\kappa )<2^{\kappa }$
. We conclude the paper with interesting open questions and discuss difficulties regarding other natural approaches to higher independence.
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