Semigroups, Algebras and Operator Theory

Kochi, India, February 2014

  • P G Romeo
  • John. C Meakin
  • A R Rajan
Conference proceedings

Part of the Springer Proceedings in Mathematics & Statistics book series (PROMS, volume 142)

Table of contents

  1. Front Matter
    Pages i-xi
  2. K. S. S. Nambooripad
    Pages 39-45
  3. M. K. Sen
    Pages 47-56
  4. Asma Ali, Clauss Haetinger, Phool Miyan, Farhat Ali
    Pages 67-79
  5. P. G. Romeo
    Pages 81-87
  6. E. Krishnan, V. Sherly
    Pages 89-103
  7. Pavel Pal, Sujit Kumar Sardar, Rajlaxmi Mukherjee Pal
    Pages 105-121
  8. Jitender Kumar, K. V. Krishna
    Pages 123-133
  9. Balmohan V. Limaye
    Pages 135-147
  10. P. Vinod Kumar, M. S. Balasubramani
    Pages 205-215

About these proceedings


This book discusses recent developments in semigroup theory and its applications in areas such as operator algebras, operator approximations and category theory. All contributing authors are eminent researchers in their respective fields, from across the world. Their papers, presented at the 2014 International Conference on Semigroups, Algebras and Operator Theory in Cochin, India, focus on recent developments in semigroup theory and operator algebras. They highlight current research activities on the structure theory of semigroups as well as the role of semigroup theoretic approaches to other areas such as rings and algebras. The deliberations and discussions at the conference point to future research directions in these areas. This book presents 16 unpublished, high-quality and peer-reviewed research papers on areas such as structure theory of semigroups, decidability vs. undecidability of word problems, regular von Neumann algebras, operator theory and operator approximations. Interested researchers will find several avenues for exploring the connections between semigroup theory and the theory of operator algebras.


Kauffman monoids Logic and languages Logic and languages Operator theory Regularization theory Semigroup

Editors and affiliations

  • P G Romeo
    • 1
  • John. C Meakin
    • 2
  • A R Rajan
    • 3
  1. 1.Department of MathematicsCochin University of Science and Technology (CUSAT)KochiIndia
  2. 2.Department of MathematicsUniversity of NebraskaLincolnUSA
  3. 3.Department of MathematicsUniversity of KeralaThiruvananthapuramIndia

Bibliographic information