Overview
Explore a comprehensive overview of recent developments in the invariant subspace problem through this 55-minute lecture by Bernard Chevreau from the University of Bordeaux. Delve into the historical context, proof techniques, and key concepts such as reflexivity and hypercyclic operators. Examine the Scott Brown method, classical interpolation, and universal operators while gaining insights into the dual algebra techniques and halfspace considerations. Understand the significance of this problem in the field of analytic function spaces and its applications as part of the Focus Program at the Fields Institute.
Syllabus
Introduction
History
Proof
Reflexivity
Reflexivity notion
Positive answer
Historical comment
Invariant subspace
Miscellaneous results
Hypercyclic operators
Dual algebra techniques
Scott Brown method
Classical interpolation
Universal operators
Halfspace
Taught by
Fields Institute