Normalization of a subgroup, in a topos, and of a word-congruence

Abstract

This paper provides a new categorical definition of a normalization operator motivated by topos theory and its applications to algebraic language theory. We first define a normalization operator in any category that admits a colimit of all monomorphisms , which we call a local state classifier. In the category of group actions for a group G, this operator coincides with the usual normalization operator, which takes a subgroup H⊂ G and returns its normalizer subgroup NorG(H)⊂ G. Using this generalized normalization operator, we prove a topos-theoretic proposition that provides an explicit description of a local state classifier of a hyperconnected quotient of a given topos. We also briefly explain how these results serve as preparation for a topos-theoretic study of regular languages, congruences of words, and syntactic monoids.

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