Nonuniqueness in Vector-Valued Calculus of Variations in L∞ and some Linear Elliptic Systems

Abstract

For a Hamiltonian H ∈ C2(RN × n) and a map u: ⊂eq Rn /! RN, we consider the supremal functional \[ 1 1 E∞ (u,) \ :=\ \|H(Du)\|L∞() . \] The "Euler-Lagrange" PDE associated to 1 is the quasilinear system \[ 2 2 A∞ u := (HP HP + H[HP] /! HPP)(Du):D2 u = 0. \] 1 and 2 are the fundamental objects of vector-valued Calculus of Variations in L∞ and first arose in recent work of the author [K1]. Herein we show that the Dirichlet problem for 2 admits for all n=N≥ 2 infinitely-many smooth solutions on the punctured ball, in the case of H(P)=|P|2 for the ∞-Laplacian and of H(P)= |P|2(P /! P)-1/n for optimised Quasiconformal maps. Nonuniqueness for the linear degenerate elliptic system A(x):D2u =0 follows as a corollary. Hence, the celebrated L∞ scalar uniqueness theory of Jensen [J] has no counterpart when N≥ 2. The key idea in the proofs is to recast 2 as a first order differential inclusion Du(x) ∈ K ⊂eq Rn× n, x∈ .