On a generalized Aviles-Giga functional: compactness, zero-energy states, regularity estimates and energy bounds

Abstract

Given any strictly convex norm \|·\| on R2 that is C1 in R2\0\, we study the generalized Aviles-Giga functional \[Iε(m):=∫ (ε |∇ m|2 + 1ε(1-\|m\|2)2) \, dx,\] for ⊂ R2 and m R2 satisfying ∇· m=0. Using, as in the euclidean case \|·\|=|·|, the concept of entropies for the limit equation \|m\|=1, ∇· m=0, we obtain the following. First, we prove compactness in Lp of sequences of bounded energy. Second, we prove rigidity of zero-energy states (limits of sequences of vanishing energy), generalizing and simplifying a result by Bochard and Pegon. Third, we obtain optimal regularity estimates for limits of sequences of bounded energy, in terms of their entropy productions. Fourth, in the case of a limit map in BV, we show that lower bound provided by entropy productions and upper bound provided by one-dimensional transition profiles are of the same order. The first two points are analogous to what is known in the euclidean case \|·\|=|·|, and the last two points are sensitive to the anisotropy of the norm \|·\|.