Linearisation at infinity and Lipschitz estimates for certain problems in the calculus of variations

Michel Chipot; Lawrence C. Evans

doi:10.1017/S0308210500026378

Synopsis

We demonstrate local Lipschitz regularity for minimisers of certain functionals which are appropriately convex and quadratic near infinity. The proof employs a blow-up argument entailing a linearisation of the Euler—Lagrange equations “at infinity”. As a application, we prove that minimisers for the relaxed optimal design problem derived by Kohn and Strang [3] are locally Lipschitz.

References

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3Kohn, R. and Strang, G.. Optimal design and relaxation of variational problems. Comm. Pure Appl. Math, (to appear).Google Scholar

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Linearisation at infinity and Lipschitz estimates for certain problems in the calculus of variations

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Linearisation at infinity and Lipschitz estimates for certain problems in the calculus of variations

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