09/10/2014, 11:00 — 13:00 — Room P4.35, Mathematics Building
Marek Ptak, University of Agriculture and Pedagogical University, Krakow
Algebras and subspaces of operators: invariant subspaces, reflexivity, hyperreflexivity and transitivity - III
- Invariant subspaces, examples of lattices of invariant subspaces.
- Reflexivity, transitivity and hyperreflexivity equivalent definitions for algebras and
- subspaces.
- Case of finite dimensional underlying Hilbert space.
- Finite dimensional subspaces of operators.
- Case of subspaces and subalgebras of Toeplitz operators on the unit disc.
- Toeplitz operators on the upper-half plane, simply- and multi-connected regions.
- Generalized Toeplitz operators.
- Toeplitz operators on Bergman space.
- Isometries and quasinormal operators.
- Consistent operators and power partial isometries.
- Multioperator case.
The course targets doctoral students and anybody else interested in the subject.
07/10/2014, 15:00 — 17:30 — Room P4.35, Mathematics Building
Marek Ptak, University of Agriculture and Pedagogical University, Krakow
Algebras and subspaces of operators: invariant subspaces, reflexivity, hyperreflexivity and transitivity - II
- Invariant subspaces, examples of lattices of invariant subspaces.
- Reflexivity, transitivity and hyperreflexivity equivalent definitions for algebras and
- subspaces.
- Case of finite dimensional underlying Hilbert space.
- Finite dimensional subspaces of operators.
- Case of subspaces and subalgebras of Toeplitz operators on the unit disc.
- Toeplitz operators on the upper-half plane, simply- and multi-connected regions.
- Generalized Toeplitz operators.
- Toeplitz operators on Bergman space.
- Isometries and quasinormal operators.
- Consistent operators and power partial isometries.
- Multioperator case.
The course targets doctoral students and anybody else interested in the subject.
02/10/2014, 11:00 — 13:00 — Room P4.35, Mathematics Building
Marek Ptak, University of Agriculture and Pedagogical University, Krakow
Algebras and subspaces of operators: invariant subspaces, reflexivity, hyperreflexivity and transitivity - I
- Invariant subspaces, examples of lattices of invariant subspaces.
- Reflexivity, transitivity and hyperreflexivity equivalent definitions for algebras and
- subspaces.
- Case of finite dimensional underlying Hilbert space.
- Finite dimensional subspaces of operators.
- Case of subspaces and subalgebras of Toeplitz operators on the unit disc.
- Toeplitz operators on the upper-half plane, simply- and multi-connected regions.
- Generalized Toeplitz operators.
- Toeplitz operators on Bergman space.
- Isometries and quasinormal operators.
- Consistent operators and power partial isometries.
- Multioperator case.
The course targets doctoral students and anybody else interested in the subject.