New applications of Hadamard-in-the-mean inequalities to incompressible variational problems

Abstract

Let D(u) be the Dirichlet energy of a map u belonging to the Sobolev space H1u0(;R2) and let A be a subclass of H1u0(;R2) whose members are subject to the constraint ∇ u = g a.e. for a given g, together with some boundary data u0. We develop a technique that, when applicable, enables us to characterize the global minimizer of D(u) in A as the unique global minimizer of the associated functional F(u):=D(u)+ ∫ f(x) \, ∇ u(x) \, dx in the free class H1u0(;R2). A key ingredient is the mean coercivity of F() on H10(;R2), which condition holds provided the `pressure' f ∈ L∞() is `tuned' according to the procedure set out in BKV23. The explicit examples to which our technique applies can be interpreted as solving the sort of constrained minimization problem that typically arises in incompressible nonlinear elasticity theory.

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