The globals of pseudovarieties of ordered semigroups containing B2 and an application to a problem proposed by Pin

Given a basis of pseudoidentities for a pseudovariety of ordered semigroups containing the 5-element aperiodic Brandt semigroup B2, under the natural order, it is shown that the same basis, over the most general graph over which it can be read, defines the global. This is used to show that the globa...

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Bibliographic Details
Main Author: Almeida, J. (author)
Other Authors: Escada, A. (author)
Format: other
Language:eng
Published: 2004
Subjects:
Semigroup
Pseudovariety
Semigroupoid
pseudoidentity
Dot-depth
Concatenation hierarchies
Online Access:http://hdl.handle.net/10316/11419
Country:Portugal
Oai:oai:estudogeral.sib.uc.pt:10316/11419
Description
Summary:Given a basis of pseudoidentities for a pseudovariety of ordered semigroups containing the 5-element aperiodic Brandt semigroup B2, under the natural order, it is shown that the same basis, over the most general graph over which it can be read, defines the global. This is used to show that the global of the level 3/2 of the refinement of Straubing-Th´erien’s concatenation hierarchy introduced by Pin and Weil has infinite vertex rank.

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