Rank and duality of escalator algebras.

Digital Document
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Summary
Abstract
Abstract
We define a specific family of finite bi-unary algebras called escalator algebras. These algebras were introduced in the work of Hyndman and Willard [9] and Little [10]. We show that they have infinite rank, are dualizable but are not strongly dualizable.
Persons
Persons
Author (aut): Beveridge, Erin Natalie
Associated name (asn): Hyndman, Jennifer
Degree Name
Degree Name
Master of Science (MSc)
Department
Department
Mathematics
DOI
DOI
https://doi.org/10.24124/2003/bpgub257
Collection(s)
Collection(s)
Dissertations and Theses
Origin Information
Date Created/Date Issued
2003
Publisher
University of Northern British Columbia
Issuance
monographic
Organizations
Degree granting institution (dgg): University of Northern British Columbia
Degree Level
Undergraduate
Subject Topic
Subject Topic
Duality theory (Mathematics).
Library of Congress Classification
Library of Congress Classification
QA155.5 .B48 2002
Extent
Extent
Number of pages in document: 75
Physical Form
Physical Form
electronic
Content type
Content type
Digital Document
Resource Type
Resource Type
Text
Genre
Genre
thesis
Language
Language
English
Handle
Handle
Handle placeholder
ISBN
ISBN
978-0-612-80678-8
Use and Reproduction
Use and Reproduction
Copyright retained by the author.
Rights Statement
Rights Statement
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Rank and duality of escalator algebras.
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Beveridge, Erin Natalie. “Rank and duality of escalator algebras”. Electronic, Thesis. Dissertations and Theses. University of Northern British Columbia, 2003. https://doi.org/https://doi.org/10.24124/2003/bpgub257.