On the Lavrentiev gap for convex, vectorial integral functionals

Abstract

We prove the absence of a Lavrentiev gap for vectorial integral functionals of the form F: g+W01,1()m\+∞\, F(u)=∫ W(x,D u)\,dx, where the boundary datum g:⊂ Rdm is sufficiently regular, W(x,) is convex and lower semicontinuous, satisfies p-growth from below and suitable growth conditions from above. More precisely, if p≤ d-1, we assume q-growth from above with q≤ (d-1)pd-1-p, while for p>d-1 we require essentially no growth conditions from above and allow for unbounded integrands. Concerning the x-dependence, we impose a well-known local stability estimate that is redundant in the autonomous setting, but in the general non-autonomous case can further restrict the growth assumptions.