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Conference in Honor of Alexander Arhangelskii
June 29 - July 3, 2003
Brooklyn College of the City University of New York
Brooklyn, NY, USA

Organizers
Raushan Buzyakova, Ralph Kopperman, Gerald Itzkowitz, Raymond Gittings, Susan Andima, Oleg Pavlov, Oleg Okunev, Dennis Burke, Vladimir Uspenskii, Witold Marciszewski, Stephen Watson, Hans-Peter Kunzi

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On some L-valued categories related to topology
by
Alexander Sostak
University of Latvia, LV-1586, Riga Latvia.

An L-valued category is a certain superstructure over an ordinary category C whose "potential" objects Ob(C) and morphisms Mor(C) could be such only to a certain degree valued an element of the lattice L and ranging from 0 to 1. In a series of papers we studied some general properties of L-valued categories as well as considered some concrete L-valued categories. It is the aim of our talk, after a very brief introduction into the theory of L-valued categories, to discuss properties of some L-valued categories related to topology.

Date received: June 2, 2003

Copyright © 2003 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Mathematical Conference Abstracts. Document # cajv-44.