Lower semicontinuity via W1,q-quasiconvexity
Abstract
We isolate a general condition, that we call "localization principle", on the integrand L:[0,∞], assumed to be continuous, under which W1,q-quasiconvexity with q∈[1,∞] is a sufficient condition for I(u)=∫ L(∇ u(x))dx to be sequentially weakly lower semicontinuous on W1,p(;m) with p∈]1,∞[. Some applications are given.
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