Convergence of approximate saddle points


AbstractRelationships between convergence properties of a family of extended real valued functions and convergence properties of the family of the sets of their (approximate or exact) saddle points are investigated. The use of Γ-limits on convergence spaces enables us to refine several theorems and to get entirely new results (i.e., on the convergence of approximate saddle points to an exact saddle point). The fundamental role of marginal functions in the convergence of (approximate) saddle points is observed. The corresponding results on convergence of minima are recovered as a special case

Similar works

Full text


Elsevier - Publisher Connector

Provided original full text link
Last time updated on 6/5/2019

This paper was published in Elsevier - Publisher Connector .

Having an issue?

Is data on this page outdated, violates copyrights or anything else? Report the problem now and we will take corresponding actions after reviewing your request.