"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.