A constrained approximation theorem for integral functionals on Lp

Abstract

Let (T, F,μ) be a σ-finite measure space, E a separable real Banach space and p≥ 1. Given a sequence of functions f, f1, f2,... from T× E to R, under general assumptions, we prove that, for each closed hyperplane V of Lp(T,E), for each u∈ V, and for each sequence \λn\ converging to ∫Tf(t,u(t))dμ, there exists a sequence \un\ in V converging to u and such that ∫Tfn(t,un(t))dμ=λn for all n large enough.

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