Twist maps as energy minimisers in homotopy classes: symmetrisation and the coarea formula

Abstract

Let = [a, b] = \x: a<|x|<b\⊂ n with 0<a<b<∞ fixed be an open annulus and consider the energy functional, equation* F [u; ] = 12 ∫ |∇ u|2|u|2 \, dx, equation* over the space of admissible incompressible Sobolev maps equation* Aφ() = \ u ∈ W1,2(, n) : ∇ u = 1 a.e. in and u|∂ = φ \, equation* where φ is the identity map of . Motivated by the earlier works TA2, TA3 in this paper we examine the twist maps as extremisers of F over Aφ() and investigate their minimality properties by invoking the coarea formula and a symmetrisation argument. In the case n=2 where Aφ() is a union of infinitely many disjoint homotopy classes we establish the minimality of these extremising twists in their respective homotopy classes a result that then leads to the latter twists being L1-local minimisers of F in Aφ(). We discuss variants and extensions to higher dimensions as well as to related energy functionals.