Regularity of absolute minimizers for continuous convex Hamiltonians

Abstract

For any n 2, ⊂, and any given convex and coercive Hamiltonian function H∈ C0(), we find an optimal sufficient condition on H, that is, for any c∈ R, the level set H-1(c) does not contains any line segment, such then any absolute minimizer u∈ AMH() enjoys the linear approximation property. As consequences, we show that when n=2, if u∈ AMH() then u∈ C1; and if u∈ AMH(2) satisfies a linear growth at the infinity, then u is a linear function on 2. In particular, if H is a strictly convex Banach norm \|·\| on R2, e.g. the lα-norm for 1<α<1, then any u∈ AMH() is C1. The ideas of proof are, instead of PDE approaches, purely variational and geometric.