In this paper we present a new extension of the celebrated Serrin's lower semicontinuity theorem. We consider an integral of the calculus of variation integral(Omega) f (x, u, Du)dx and we prove its lower semicontinuity in W-loc(1,1) (Omega) with respect to the strong L-loc(1) norm topology, under the usual continuity and convexity property of the integrand f (x, s, xi), only assuming a mild (more precisely, local) condition on the independent variable x in R-n, say local Lipschitz continuity, which - we show with a specific counterexample - cannot be replaced, in general, by local Holder continuity.
An extension of the Serrin's lower semicontinuity theorem / M. GORI; P. MARCELLINI. - In: JOURNAL OF CONVEX ANALYSIS. - ISSN 0944-6532. - STAMPA. - 9:(2002), pp. 475-502.
An extension of the Serrin's lower semicontinuity theorem
GORI, MICHELE;MARCELLINI, PAOLO
2002
Abstract
In this paper we present a new extension of the celebrated Serrin's lower semicontinuity theorem. We consider an integral of the calculus of variation integral(Omega) f (x, u, Du)dx and we prove its lower semicontinuity in W-loc(1,1) (Omega) with respect to the strong L-loc(1) norm topology, under the usual continuity and convexity property of the integrand f (x, s, xi), only assuming a mild (more precisely, local) condition on the independent variable x in R-n, say local Lipschitz continuity, which - we show with a specific counterexample - cannot be replaced, in general, by local Holder continuity.
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