English

Integral functionals on $L^p$-spaces: infima over sub-level sets

Optimization and Control 2013-12-20 v1

Abstract

In this paper, we establish the following result: Let (T,F,μ)(T,{\cal F},\mu) be a σ\sigma-finite measure space, let YY be a reflexive real Banach space, and let φ,ψ:YR\varphi, \psi:Y\to {\bf R} be two sequentially weakly lower semicontinuous functionals such that infyYmin{φ(y),ψ(y)}1+yp>\inf_{y\in Y}{{\min\{\varphi(y),\psi(y)\}}\over {1+\|y\|^p}}>-\infty for some p>0p>0. Moreover, assume that φ\varphi has no global minima, while φ+λψ\varphi+\lambda\psi is coercive and has a unique global minimum for each λ>0\lambda>0. Then, for each γL(T)L1(T){0}\gamma\in L^{\infty}(T)\cap L^1(T)\setminus \{0\}, with γ0\gamma\geq 0, and for each r>infYψr>\inf_{Y}\psi, if we put Vγ,r={uLp(T,Y):Tγ(t)ψ(u(t))dμrTγ(t)dμ} ,V_{\gamma,r}= \left \{u\in L^p(T,Y) : \int_T\gamma(t)\psi(u(t))d\mu\leq r\int_T\gamma(t)d\mu\right \}\ , we have infuVγ,rTγ(t)φ(u(t))dμ=infψ1(r)φTγ(t)dμ .\inf_{u\in V_{\gamma,r}} \int_T\gamma(t)\varphi(u(t))d\mu= \inf_{\psi^{-1}(r)}\varphi\int_T\gamma(t)d\mu\ .

Keywords

Cite

@article{arxiv.1312.5715,
  title  = {Integral functionals on $L^p$-spaces: infima over sub-level sets},
  author = {Biagio Ricceri},
  journal= {arXiv preprint arXiv:1312.5715},
  year   = {2013}
}
R2 v1 2026-06-22T02:32:00.094Z