Giuseppe Cordaro

Copyright © 2000 Giuseppe Cordaro. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let E be a real separable and reflexive Banach space, X⊆E weakly closed and unbounded, Φ and Ψ two non-constant weakly sequentially lower sernicontinuous functionals defined on X, such that Φ+λΨ is coercive for each λ≥0. In this setting, if supλ≥0infx∈X(Φ(x)+λ(Ψ(x)+ρ))=infx∈Xsupλ≥0(Φ(x)+λ(Ψ(x)+ρ)) for every ρ∈R, then, one has supλ≥0infx∈X(Φ(x)+λΨ(x)+h(λ))=infx∈Xsupλ≥0(Φ(x)+λΨ(x)h(λ)), for every concave function h:[0,+∞[→R.