A simple example of the weak discontinuity of f ∫ ∇ f

Abstract

Verifying lower-semicontinuity of integral functionals in the weak topology of Sobolev spaces is a central theme in the calculus of variations. For integral functionals with p-growth, quasiconvexity is a necessary condition for weak lower-semicontinuity in W1,p, but is only sufficient if some additional conditions are met.The standard functional showing the necessity of additional conditions is f ∫ ∇ f, which fails to be weakly lower-semicontinuous. However, the common examples showing this failure are non-injective and have a lot of shear. The aim of this short note is to point out that a known sequence of conformal diffeomorphisms of the d-dimensional unit ball that converges weakly to a constant in W1,d, exemplifies the weak discontinuity of this functional even when restricting a space to functions which are "as nice as possible".