Transversality Properties: Primal Sufficient Conditions
Abstract
The paper studies 'good arrangements' (transversality properties) of collections of sets in a normed vector space near a given point in their intersection. We target primal (metric and slope) characterizations of transversality properties in the nonlinear setting. The Holder case is given a special attention. Our main objective is not formally extending our earlier results from the Holder to a more general nonlinear setting, but rather to develop a general framework for quantitative analysis of transversality properties. The nonlinearity is just a simple setting, which allows us to unify the existing results on the topic. Unlike the well-studied subtransversality property, not many characterizations of the other two important properties: semitransversality and transversality have been known even in the linear case. Quantitative relations between nonlinear transversality properties and the corresponding regularity properties of set-valued mappings as well as nonlinear extensions of the new transversality properties of a set-valued mapping to a set in the range space due to Ioffe are also discussed.
Cite
@article{arxiv.1902.06186,
title = {Transversality Properties: Primal Sufficient Conditions},
author = {Nguyen Duy Cuong and Alexander Y. Kruger},
journal= {arXiv preprint arXiv:1902.06186},
year = {2022}
}
Comments
33 pages