{\L}ojasiewicz inequalities with explicit exponent for smallest singular value functions
Algebraic Geometry
2016-04-12 v1
Abstract
Let be a ()-real polynomial matrix and let be the smallest singular value function of In this paper, we first give the following {\em nonsmooth} version of \L ojasiewicz gradient inequality for the function with an explicit exponent: {\em For any , there exist and such that we have for all \begin{equation*} \inf \{ \| w \| \ : \ w \in {\partial} f(x) \} \ \ge \ c\, |f(x)-f(\bar x)|^{1 - \frac{2}{\mathscr R(n+p,2d+2)}}, \end{equation*} where is the limiting subdifferential of at , and if and if } Then we establish some versions of \L ojasiewicz inequality for the distance function with explicit exponents, locally and globally, for the smallest singular value function of the matrix .
Cite
@article{arxiv.1604.02805,
title = {{\L}ojasiewicz inequalities with explicit exponent for smallest singular value functions},
author = {Si Tiep Dinh and Tien Son Pham},
journal= {arXiv preprint arXiv:1604.02805},
year = {2016}
}