On the -limit for a non-uniformly bounded sequence of two phase metric functionals

Abstract

In this study we consider the -limit of a highly oscillatory Riemannian metric length functional as its period tends to 0. The metric coefficient takes values in either \1,∞\ or \1,β -p\ where β, > 0 and p ∈ (0,∞). We find that for a large class of metrics, in particular those metrics whose surface of discontinuity forms a differentiable manifold, the -limit exists, as in the uniformly bounded case. However, when one attempts to determine the -limit for the corresponding boundary value problem, the existence of the -limit depends on the value of p. Specifically, we show that the power p=1 is critical in that the -limit exists for p < 1, whereas it ceases to exist for p ≥ 1. The results here have applications in both nonlinear optics and the effective description of a Hamiltonian particle in a discontinuous potential.