Integral representations of lower semicontinuous envelopes and Lavrentiev Phenomenon for non continuous Lagrangians

Abstract

We consider the functional F∞(u)=∫f(x,u(x),∇ u(x)) dx u∈ + W01,∞(,R) where is an open bounded Lipschitz subset of RN and ∈ W1,∞(). We do not assume neither convexity or continuity of the Lagrangian w.r.t. the last variable. We prove that, under suitable assumptions, the lower semicontinuous envelope of F∞ both in +W1,∞() and in the larger space +W1,p() can be represented by means of the bipolar f** of f. In particular we can also exclude Lavrentiev Phenomenon between W1,∞() and W1,1() for autonomous Lagrangians.