A constrained approximation theorem for integral functionals on $L^p$
Authors
Biagio Ricceri
Abstract
Let $(T,{\cal F},μ)$ be a $σ$-finite measure space, $E$ a separable real Banach space and $p\geq 1$. Given a sequence of functions $f, f_1, f_2,...$ from $T\times E$ to ${\bf R}$, under general assumptions, we prove that, for each closed hyperplane $V$ of $L^p(T,E)$, for each $u\in V$, and for each sequence $\{λ_n\}$ converging to $\int_Tf(t,u(t))dμ$, there exists a sequence $\{u_n\}$ in $V$ converging to $u$ and such that $\int_Tf_n(t,u_n(t))dμ=λ_n$ for all $n$ large enough.
