Strict convexity and the regularity of solutions to variational problems

Cellina, Arrigo

doi:10.1051/cocv/2015034

Geodesic

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Strict convexity and the regularity of solutions to variational problems

Cellina, Arrigo ¹

¹ Dipartimento di Matematica e Applicazioni, Università degli Studi di Milano-Bicocca, Via R. Cozzi 53, 20125 Milano, Italy

ESAIM: Control, Optimisation and Calculus of Variations, Tome 22 (2016) no. 3, pp. 862-871

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Résumé

We consider the problem of minimizing

\int_{Ω} [L (\nabla v (x)) + g (x, v (x))] d x on u^{0} + W_{0}^{1, 2} (Ω)

where

Ω

is a bounded open subset of

ℝ^{N}

and

L

is a convex function that grows quadratically outside the unit ball, while, when

| \nabla v | < 1

, it behaves like

{| \nabla v |}^{p}

with

1 < p < 2

. We show that, for each

ω \subset \subset Ω

, there exists a constant

H

, depending on

ω

but not on

p

, such that both

{∥ \nabla u ∥}_{W^{1, 2} (ω)} \leq H and {∥ \frac{\nabla u}{{| \nabla u |}^{2 - p}} ∥}_{W^{1, 2} (ω)} \leq \frac{H}{{(p - 1)}^{2}};

in particular, for every

i = 1, . . . N

, we have

max {\frac{| u_{x_{i}} |}{{| \nabla u |}^{2 - p}}, | u_{x_{i}} |} \in W_{l o c}^{1, 2} (Ω)

Reçu le : 2014-12-12

MR Zbl

DOI : 10.1051/cocv/2015034

Classification : 49K10
Keywords: Regularity of solutions, higher differentiability, strict convexity

Affiliations des auteurs :

Cellina, Arrigo ¹

¹ Dipartimento di Matematica e Applicazioni, Università degli Studi di Milano-Bicocca, Via R. Cozzi 53, 20125 Milano, Italy

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     author = {Cellina, Arrigo},
     title = {Strict convexity and the regularity of solutions to variational problems},
     journal = {ESAIM: Control, Optimisation and Calculus of Variations},
     pages = {862--871},
     publisher = {EDP-Sciences},
     volume = {22},
     number = {3},
     year = {2016},
     doi = {10.1051/cocv/2015034},
     mrnumber = {3527948},
     zbl = {1344.49059},
     language = {en},
     url = {http://geodesic.mathdoc.fr/articles/10.1051/cocv/2015034/}
}

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Cellina, Arrigo. Strict convexity and the regularity of solutions to variational problems. ESAIM: Control, Optimisation and Calculus of Variations, Tome 22 (2016) no. 3, pp. 862-871. doi: 10.1051/cocv/2015034

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