A dynamical systems approach to the Kadison-Singer problem |
| |
Authors: | Vern I Paulsen |
| |
Institution: | Department of Mathematics, University of Houston, Houston, TX 77204-3476, USA |
| |
Abstract: | In these notes we develop a link between the Kadison-Singer problem and questions about certain dynamical systems. We conjecture that whether or not a given state has a unique extension is related to certain dynamical properties of the state. We prove that if any state corresponding to a minimal idempotent point extends uniquely to the von Neumann algebra of the group, then every state extends uniquely to the von Neumann algebra of the group. We prove that if any state arising in the Kadison-Singer problem has a unique extension, then the injective envelope of a C*-crossed product algebra associated with the state necessarily contains the full von Neumann algebra of the group. We prove that this latter property holds for states arising from rare ultrafilters and δ-stable ultrafilters, independent, of the group action and also for states corresponding to non-recurrent points in the corona of the group. |
| |
Keywords: | Kadison-Singer problem Dynamical system Ultrafilter Non-recurrent point |
本文献已被 ScienceDirect 等数据库收录! |
|