Generators for the semigroup of endomorphisms of an independence Algebra

Given an independence algebra A of infinite rank, we denote the endomorphism monoid and the automorphism group of A by End(A)and Aut(A) respectively. This paper is concerned with finding minimal subsets R of End(A) such that Aut(A) [ E(End(A)) [ R is a generating set for End(A), where E(End(A)) deno...

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Bibliographic Details
Main Author: Araújo, João (author)
Format: article
Language:por
Published: 2015
Subjects:
Semigroups
Independence algebras
Endomorphisms
Generators
Online Access:http://hdl.handle.net/10400.2/3814
Country:Portugal
Oai:oai:repositorioaberto.uab.pt:10400.2/3814
Description
Summary:Given an independence algebra A of infinite rank, we denote the endomorphism monoid and the automorphism group of A by End(A)and Aut(A) respectively. This paper is concerned with finding minimal subsets R of End(A) such that Aut(A) [ E(End(A)) [ R is a generating set for End(A), where E(End(A)) denotes its set of idempotents.

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