Operator Algebras, Operator Theory and Applications

  • Maria Amélia Bastos
  • Amarino Brites Lebre
  • Frank-Olme Speck
  • Israel Gohberg
Conference proceedings

Part of the Operator Theory: Advances and Applications book series (OT, volume 181)

Table of contents

  1. Front Matter
    Pages i-xiv
  2. Summer School Lecture Notes

    1. Front Matter
      Pages 1-1
    2. Stephen C. Power
      Pages 3-32
    3. Bernd Silbermann
      Pages 33-66
  3. Workshop Contributed Articles

    1. Front Matter
      Pages 119-119
    2. Florin P. Boca
      Pages 121-142
    3. Luís P. Castro, David Kapanadze
      Pages 159-172
    4. Ana C. Conceição, Viktor G. Kravchenko
      Pages 173-185
    5. Ekaterina Gots, Lev Lyakhov
      Pages 187-199
    6. Rachid El Harti
      Pages 201-206
    7. Vladimir Manuilov
      Pages 295-308
    8. Sérgio Mendes
      Pages 309-320
    9. Vladimir S. Rabinovich, Steffen Roch, Bernd Silbermann
      Pages 385-391
    10. Carlos Correia Ramos, Nuno Martins, Paulo R. Pinto
      Pages 417-427

About these proceedings


This book is composed of three survey lecture courses and nineteen invited research papers presented to WOAT 2006 - the International Summer School and Workshop on Operator Algebras, Operator Theory and Applications, which was held at Lisbon in September 2006. The volume reflects recent developments in the area of operator algebras and their interaction with research fields in complex analysis and operator theory.

The lecture courses are:

Subalgebras of Graph C*-algebras, by Stephen Power: An introduction to two classes of non-selfadjoint operator algebras, the generalized analytic Toeplitz algebras associated with the Fock space of a graph and subalgebras of graph C*-algebras;

C*-algebras and asymptotic spectral theory, by Bernd Silbermann: Three topics on numerical functional analysis that are the cornerstones in asymptotic spectral theory: stability, fractality and Fredholmness;

Toeplitz operator algebras and complex analysis, by Harald Upmeier: A survey concerning Hilbert spaces of holomorphic functions on Hermitian symmetric domains of arbitrary rank and dimension, in relation to operator theory, harmonic analysis and quantization.


Fock space Hilbert space Toeplitz algebra algebra complex analysis functional analysis operator algebra

Editors and affiliations

  • Maria Amélia Bastos
    • 1
  • Amarino Brites Lebre
    • 1
  • Frank-Olme Speck
    • 1
  • Israel Gohberg
    • 2
  1. 1.Departamento de MatemáticaInstituto Superior Técnico, U.T.L.LisboaPortugal
  2. 2.School of Mathematical Sciences Raymond and Beverly Sackler Faculty of Exact SciencesTel Aviv UniversityRamat AvivIsrael

Bibliographic information