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Poincaré inequalities for Sobolev spaces with matrix-valued weights and applications to degenerate partial differential equations

Part of: Partial differential equations Parabolic equations and systems Linear function spaces and their duals Elliptic equations and systems Inequalities Hyperbolic equations and systems Representations of solutions

Published online by Cambridge University Press:  22 April 2018

Dario D. Monticelli ,
Kevin R. Payne  and
Fabio Punzo
Dario D. Monticelli
Affiliation:
Dipartimento di Matematica, Politecnico di Milano, Via Bonardi 9, 20133 Milan, Italy (dario.monticelli@polimi.it)
Kevin R. Payne
Affiliation:
Dipartimento di Matematica ‘F. Enriques’, Università degli Studi di Milano, via C. Saldini 50, 20133 Milan, Italy (kevin.payne@unimi.it)
Fabio Punzo
Affiliation:
Dipartimento di Matematica e Informatica, Università della Calabria, via Pietro Bucci, 87036 Arcavacata di Rende (CS), Italy
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Abstract

For bounded domains Ω, we prove that the Lp-norm of a regular function with compact support is controlled by weighted Lp-norms of its gradient, where the weight belongs to a class of symmetric non-negative definite matrix-valued functions. The class of weights is defined by regularity assumptions and structural conditions on the degeneracy set, where the determinant vanishes. In particular, the weight A is assumed to have rank at least 1 when restricted to the normal bundle of the degeneracy set S. This generalization of the classical Poincaré inequality is then applied to develop a robust theory of first-order Lp-based Sobolev spaces with matrix-valued weight A. The Poincaré inequality and these Sobolev spaces are then applied to produce various results on existence, uniqueness and qualitative properties of weak solutions to boundary-value problems for degenerate elliptic, degenerate parabolic and degenerate hyperbolic partial differential equations (PDEs) of second order written in divergence form, where A is calibrated to the matrix of coefficients of the second-order spatial derivatives. The notion of weak solution is variational: the spatial states belong to the matrix-weighted Sobolev spaces with p = 2. For the degenerate elliptic PDEs, the Dirichlet problem is treated by the use of the Poincaré inequality and Lax–Milgram theorem, while the treatment of the Cauchy–Dirichlet problem for the degenerate evolution equations relies only on the Poincaré inequality and the parabolic and hyperbolic counterparts of the Lax–Milgram theorem.

Keywords

degenerate elliptic equationsparabolic and hyperbolic equationsPoincaré inequalitiesSobolev spacesmatrix-valued weightsLax–Milgram theorem

MSC classification

Primary: 26D10: Inequalities involving derivatives and differential and integral operators 35A23: Inequalities involving derivatives and differential and integral operators, inequalities for integrals 35J70: Degenerate elliptic equations 35L80: Degenerate hyperbolic equations 46E35: Sobolev spaces and other spaces of “smooth” functions, embedding theorems, trace theorems
Secondary: 35B50: Maximum principles 35D30: Weak solutions 35J25: Boundary value problems for second-order elliptic equations 35K20: Initial-boundary value problems for second-order parabolic equations 35L20: Initial-boundary value problems for second-order hyperbolic equations
Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , Volume 149 , Issue 1 , February 2019 , pp. 61 - 100
Copyright
Copyright © Royal Society of Edinburgh 2018 

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Footnotes

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Present address: Dipartimento di Matematica, Politecnico di Milano, Via Bondardi 9, 20133 Milan, Italy (fabio.punzo@polimi.it).