Ordered Algebraic Structures

The 1991 Conrad Conference

  • J. Martinez
  • C. Holland

Table of contents

  1. Front Matter
    Pages i-xiii
  2. Groups & Vector Spaces

    1. Front Matter
      Pages 1-1
    2. S. J. Bernau
      Pages 3-10
    3. P. F. Conrad, S. M. Lin, D. G. Nelson
      Pages 11-30
    4. Michael R. Darnel
      Pages 31-49
    5. A. M. W. Glass, Stephen H. McCleary
      Pages 51-71
    6. Y. K. Kim, A. H. Rhemtulla
      Pages 73-79
  3. Rings

    1. Front Matter
      Pages 97-97
    2. A. Benhissi, P. Ribenboim
      Pages 99-109
    3. Anthony W. Hager, Jorge Martinez
      Pages 133-157
    4. Melvin Henriksen, Suzanne Larson
      Pages 159-168
    5. Niels Schwartz
      Pages 169-202
    6. Stuart A. Steinberg
      Pages 203-223
    7. Scott D. Woodward
      Pages 235-249
  4. Back Matter
    Pages 251-256

About this book


This volume contains a selection of papers presented at the 1991 Conrad Conference, held in Gainesville, Florida, USA, in December, 1991. Together, these give an overview of some recent advances in the area of ordered algebraic structures. The first part of the book is devoted to ordered permutation groups and universal, as well as model-theoretic, aspects. The second part deals with material variously connected to general topology and functional analysis. Collectively, the contents of the book demonstrate the wide applicability of order-theoretic methods, and how ordered algebraic structures have connections with many research disciplines.
For researchers and graduate students whose work involves ordered algebraic structures.


Algebraic structure Lattice Permutation Vector space algebra functional analysis

Editors and affiliations

  • J. Martinez
    • 1
  • C. Holland
    • 2
  1. 1.Caribbean Mathematics Foundation, Department of MathematicsUniversity of FloridaGainesvilleUSA
  2. 2.Department of Mathematics and StatisticsBowling Green State UniversityBowling GreenUSA

Bibliographic information