Integral functionals on Lp-spaces: infima over sub-level sets

Abstract

In this paper, we establish the following result: Let (T, F,μ) be a σ-finite measure space, let Y be a reflexive real Banach space, and let , :Y R be two sequentially weakly lower semicontinuous functionals such that ∈fy∈ Y\(y),(y)\ 1+\|y\|p>-∞ for some p>0. Moreover, assume that has no global minima, while +λ is coercive and has a unique global minimum for each λ>0. Then, for each γ∈ L∞(T) L1(T) \0\, with γ≥ 0, and for each r>∈fY, if we put Vγ,r= \u∈ Lp(T,Y) : ∫Tγ(t)(u(t))dμ≤ r∫Tγ(t)dμ \\ , we have ∈fu∈ Vγ,r ∫Tγ(t)(u(t))dμ= ∈f-1(r)∫Tγ(t)dμ\ .