A uniqueness criterion and a counterexample to regularity in an incompressible variational problem
Abstract
In this paper we consider the problem of minimizing functionals of the form E(u)=∫B f(x,∇ u) \,dx in a suitably prepared class of incompressible, planar maps u: B → R2. Here, B is the unit disk and f(x,) is quadratic and convex in . It is shown that if u is a stationary point of E in a sense that is made clear in the paper, then u is a unique global minimizer of E(u) provided the gradient of the corresponding pressure satisfies a suitable smallness condition. We apply this result to construct a non-autonomous, uniformly convex functional f(x,), depending smoothly on but discontinuously on x, whose unique global minimizer is the so-called N-covering map, which is Lipschitz but not C1.
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