Rank and duality of escalator algebras.

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 Level

Subjects and Classifications

Subject Topic	Subject Topic Duality theory (Mathematics).
Library of Congress Classification	Library of Congress Classification QA155.5 .B48 2002

Resource Description

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

Identifiers

Handle	Handle Handle placeholder
ISBN	ISBN 978-0-612-80678-8

Access and Rights

Use and Reproduction	Use and Reproduction Copyright retained by the author.
Rights Statement	Rights Statement IN COPYRIGHT

Language	English
Name	Rank and duality of escalator algebras.
Authored on	2025-03-25
MIME type	application/pdf
File size	1644760
Media Use	Original File

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