A New Characterisation of ∞-Harmonic and p-Harmonic Maps via Affine Variations in L∞

Abstract

Let u: ⊂eq Rn RN be a smooth map and n,N ∈ N. The ∞-Laplacian is the PDE system \[ 1 1 ∞ u \, :=\, (Du Du + |Du|2[Du]\! I) :D2u\, =\, 0, \] where [Du] := ProjR(Du). 1 constitutes the fundamental equation of vectorial Calculus of Variations in L∞, associated to the model functional \[ 2 2 E∞ (u,')\, =\, \| |Du|2\|L∞(') ,\ \ \ ' . \] We show that generalised solutions to 1 can be characterised in terms of 2 via a set of designated affine variations. For the scalar case N=1, we utilise the theory of viscosity solutions of Crandall-Ishii-Lions. For the vectorial case N≥ 2, we utilise the recently proposed by the author theory of D-solutions. Moreover, we extend the result described above to the p-Laplacian, 1<p<∞.