Contents/conteúdo

Departamento de Matemática Técnico Técnico

Álgebras e subespaços de operadores  RSS

Anteriores

09/10/2014, 11:00 — 13:00 — Sala P4.35, Pavilhão de Matemática
Marek Ptak, University of Agriculture and Pedagogical University, Krakow

Algebras and subspaces of operators: invariant subspaces, reflexivity, hyperreflexivity and transitivity - III

  1. Invariant subspaces, examples of lattices of invariant subspaces.
  2. Reflexivity, transitivity and hyperreflexivity equivalent definitions for algebras and
  3. subspaces.
  4. Case of finite dimensional underlying Hilbert space.
  5. Finite dimensional subspaces of operators.
  6. Case of subspaces and subalgebras of Toeplitz operators on the unit disc.
  7. Toeplitz operators on the upper-half plane, simply- and multi-connected regions.
  8. Generalized Toeplitz operators.
  9. Toeplitz operators on Bergman space.
  10. Isometries and quasinormal operators.
  11. Consistent operators and power partial isometries.
  12. Multioperator case.

The course targets doctoral students and anybody else interested in the subject.

link

07/10/2014, 15:00 — 17:30 — Sala P4.35, Pavilhão de Matemática
Marek Ptak, University of Agriculture and Pedagogical University, Krakow

Algebras and subspaces of operators: invariant subspaces, reflexivity, hyperreflexivity and transitivity - II

  1. Invariant subspaces, examples of lattices of invariant subspaces.
  2. Reflexivity, transitivity and hyperreflexivity equivalent definitions for algebras and
  3. subspaces.
  4. Case of finite dimensional underlying Hilbert space.
  5. Finite dimensional subspaces of operators.
  6. Case of subspaces and subalgebras of Toeplitz operators on the unit disc.
  7. Toeplitz operators on the upper-half plane, simply- and multi-connected regions.
  8. Generalized Toeplitz operators.
  9. Toeplitz operators on Bergman space.
  10. Isometries and quasinormal operators.
  11. Consistent operators and power partial isometries.
  12. Multioperator case.

The course targets doctoral students and anybody else interested in the subject.

link

02/10/2014, 11:00 — 13:00 — Sala P4.35, Pavilhão de Matemática
Marek Ptak, University of Agriculture and Pedagogical University, Krakow

Algebras and subspaces of operators: invariant subspaces, reflexivity, hyperreflexivity and transitivity - I

  1. Invariant subspaces, examples of lattices of invariant subspaces.
  2. Reflexivity, transitivity and hyperreflexivity equivalent definitions for algebras and
  3. subspaces.
  4. Case of finite dimensional underlying Hilbert space.
  5. Finite dimensional subspaces of operators.
  6. Case of subspaces and subalgebras of Toeplitz operators on the unit disc.
  7. Toeplitz operators on the upper-half plane, simply- and multi-connected regions.
  8. Generalized Toeplitz operators.
  9. Toeplitz operators on Bergman space.
  10. Isometries and quasinormal operators.
  11. Consistent operators and power partial isometries.
  12. Multioperator case.

The course targets doctoral students and anybody else interested in the subject.

link

Parcialmente suportado pelo projecto PTDC/MAT/121837/2010 (FCT/Portugal).