"The Current Status of  the Mityagin-Pelczynski Problem"

 

By

 

ALEXANDER GONCHAROV

(BİLKENT UNIVERSITY)

 

 

 

 

Abstract:  Suppose X is a nuclear Frechet space with a topological basis and E is its complemented subspace.  Does E possess a basis?  This question, attributed to B. S.  Mityagin and A. Pelczynski,  is considered as the most important unsolved problem in the structure theory of  locally convex spaces. We give a short review of  related results, including recent results by D.Vogt.

 

 

 

 

Date:  Monday, February 9, 2015

Time: 14:40

Place: Mathematics Seminar Room, SA-141

 

 

 

Tea and cookies will be served before the seminar.