Talk in Alicante on outer limits of subdifferentials

Title: Outer limits of subdifferentials for min-max type functions

Time and Venue: 1pm, Friday 7 July 2017, University of Alicante
Abstract: Outer limits of subdifferentials is a limiting construction that can be used to estimate the error bound modulus in a range of problems. We present some new result related to the evaluation of such limiting subdifferentials for max-type and min-max functions.

This talk is based on joint work with Andrew Eberhard and Tian Sang.

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Two applications of lexicographic differentiation

Lexicographic differentiation was introduced by Yurii Nesterov in 1987. A recent and more accessible overview is given in his Mathematical Programming paper. At the CIAO workshop on 27 April I talk about lexicographic differentiation and mention two applications: the construction of directed subdifferential and geometric conditions for facial dual completeness of closed convex cones.

The function shown in the Mathematica rendering is lexicographically smooth, but is neither quasidifferentiable nor tame. The idea of this example was suggested by Jeffrey Pang (NUS).

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Talk at the Workshop on Variational Analysis with Applications

Title: Outer limits of subdifferentials for min-max type functions
Date and Place: Workshop on Variational Analysis with Applications, 13–14 December 2016, PolyU (Hong Kong)
Abstract: Outer limits of subdifferentials is a limiting construction that can be used to estimate the error bound modulus. We present some new result related to the evaluation of such limiting subdifferentials for max-type and min-max functions.

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Talk at Federation University Australia

Speaker: Dr Vera Roshchina, RMIT University

Date and Time: Tuesday 2 August 2016, 11:00am

Title: Subdifferentials of structured functions

Abstract:

I will talk about geometric construction of Fréchet and limiting subdifferentials for finite minima of functions subdifferentiable in the sense of Demyanov-Rubinov. Such functions have convex directional derivatives and under additional assumptions their subdifferentials preserve enough directional information to make such construction possible. For instance, approximate convex functions introduced by Huynh Van Ngai, Dinh The Luc and Michel Théra satisfy such assumptions.

These results are in the same spirit as the classic expressions for the Clarke subdifferential in terms of quasidifferentials originally developed by Demyanov and Rubinov.

The talk will be based on some old papers and recent joint work with Tian Sang (RMIT University).

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