English

On the infimum of certain functionals

Functional Analysis 2016-02-24 v1 Optimization and Control

Abstract

In this note, in particular, we establish the following result: Let XX be a real Banach space, φX{0}\varphi\in X^*\setminus \{0\} and ψ:XR\psi:X\to {\bf R} a Lipschitzian functional with Lipschitz constant equal to φX\varphi\|_X^{*}. Then, we have max{infxX(φ(x)+ψ(x)),infxX(φ(x)ψ(x))}=infxX(φ(x)+ψ(x))\max\left\{\inf_{x\in X}(\varphi(x)+\psi(x)),\inf_{x\in X}(\varphi(x)-\psi(x))\right\}=\inf_{x\in X}(\varphi(x)+|\psi(x)|) and lim infx+(φ(x)+ψ(x))=infxX(φ(x)+ψ(x)) .\liminf_{\|x\|\to +\infty}(\varphi(x)+|\psi(x)|)=\inf_{x\in X}(\varphi(x)+|\psi(x)|)\ .

Keywords

Cite

@article{arxiv.1602.07158,
  title  = {On the infimum of certain functionals},
  author = {Biagio Ricceri},
  journal= {arXiv preprint arXiv:1602.07158},
  year   = {2016}
}
R2 v1 2026-06-22T12:55:58.036Z