Viscosity Coderivatives and Their Limiting Behavior in Smooth Banach Spaces

Authors

Boris S. Mordukhovich, Wayne State University
Yongheng Shao, Wayne State University
Qiji Jim Zhu, Western Michigan UniversityFollow

Document Type

Article

Publication Date

3-2000

Abstract

This paper concerns with generalized differentiation of set-valued and nonsmooth mappings between Banach spaces. We study the so-called viscosity coderivatives of multifunctions and their limiting behavior under certain geometric assumptions on spaces in question related to the existence of smooth bump functions of any kind. The main results include various calculus rules for viscosity coderivatives and their topological limits. They are important in applications to variational analysis and optimization.

Comments

https://doi.org/10.1023/A:1009881924265

WMU ScholarWorks Citation

Mordukhovich, Boris S.; Shao, Yongheng; and Zhu, Qiji Jim, "Viscosity Coderivatives and Their Limiting Behavior in Smooth Banach Spaces" (2000). Math Faculty Publications. 23.
https://scholarworks.wmich.edu/math_pubs/23

Published Citation

Mordukhovich, B.S., Shao, Y. & Zhu, Q. Viscosity Coderivatives and Their Limiting Behavior in Smooth Banach Spaces. Positivity, 4, 1–39 (2000). https://doi.org/10.1023/A:1009881924265