Nondiffusive variational problems with distributional and weak gradient constraints

Abstract

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In this article, we consider nondiffusive variational problems with mixed boundary conditions and (distributional and weak) gradient constraints. The upper bound in the constraint is either a function or a Borel measure, leading to the state space being a Sobolev one or the space of functions of bounded variation. We address existence and uniqueness of the model under low regularity assumptions, and rigorously identify its Fenchel pre-dual problem. The latter in some cases is posed on a nonstandard space of Borel measures with square integrable divergences. We also establish existence and uniqueness of solution to this pre-dual problem under some assumptions. We conclude the article by introducing a mixed finite-element method to solve the primal-dual system. The numerical examples illustrate the theoretical findings.

Keywords

• nondiffusive variational problems
• distributional derivatives
• weak derivatives
• gradient constraint
• fenchel dual
• borel measure
• mixed finite-element method
• 35j85
• 58e35
• 90c46
• 35k85