Special Classes of Semigroups

  • Attila Nagy

Part of the Advances in Mathematics book series (ADMA, volume 1)

Table of contents

  1. Front Matter
    Pages i-viii
  2. Attila Nagy
    Pages 1-33
  3. Attila Nagy
    Pages 35-42
  4. Attila Nagy
    Pages 43-57
  5. Attila Nagy
    Pages 59-68
  6. Attila Nagy
    Pages 69-75
  7. Attila Nagy
    Pages 77-91
  8. Attila Nagy
    Pages 93-107
  9. Attila Nagy
    Pages 109-117
  10. Attila Nagy
    Pages 119-135
  11. Attila Nagy
    Pages 137-173
  12. Attila Nagy
    Pages 175-182
  13. Attila Nagy
    Pages 183-197
  14. Attila Nagy
    Pages 199-213
  15. Attila Nagy
    Pages 215-222
  16. Attila Nagy
    Pages 223-246
  17. Attila Nagy
    Pages 247-258
  18. Back Matter
    Pages 259-269

About this book

Introduction

In semigroup theory there are certain kinds of band decompositions, which are very useful in the study of the structure semigroups. There are a number of special semigroup classes in which these decompositions can be used very successfully. The book focuses attention on such classes of semigroups. Some of them are partially discussed in earlier books, but in the last thirty years new semigroup classes have appeared and a fairly large body of material has been published on them. The book provides a systematic review on this subject. The first chapter is an introduction. The remaining chapters are devoted to special semigroup classes. These are Putcha semigroups, commutative semigroups, weakly commutative semigroups, R-Commutative semigroups, conditionally commutative semigroups, RC-commutative semigroups, quasi commutative semigroups, medial semigroups, right commutative semigroups, externally commutative semigroups, E-m semigroups, WE-m semigroups, weakly exponential semigroups, (m,n)-commutative semigroups and n(2)-permutable semigroups.
Audience: Students and researchers working in algebra and computer science.

Keywords

DEX Group theory algebra boundary element method commutative property computer computer science review semigroup

Authors and affiliations

  • Attila Nagy
    • 1
  1. 1.Department of Algebra, Institute of MathematicsBudapest University of Technology and EconomicsHungary

Bibliographic information

  • DOI https://doi.org/10.1007/978-1-4757-3316-7
  • Copyright Information Springer Science+Business Media Dordrecht 2001
  • Publisher Name Springer, Boston, MA
  • eBook Packages Springer Book Archive
  • Print ISBN 978-1-4419-4853-3
  • Online ISBN 978-1-4757-3316-7
  • About this book