Relaxation for highly discontinuous, possibly unbounded, integral functionals

Abstract

We consider the functional \[ F(u)=∫ f(∇ u)\,dx u∈+W1,10() \] where is a Lipschitz bounded open set of N, f:N \+∞\ is a superlinear Borel function, ∈ W1,∞(). We prove that, if f is superlinear and satisfies very weak assumptions, then the Lavrentiev phenomenon does not occur. We underline that our assumptions include the case of non continuous, non convex, and unbounded Lagrangians.

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