On Invariant MASAs for Endomorphisms of the Cuntz Algebras

Abstract

The problem of existence of standard (i.e. product-type) invariant MASAs for endomorphisms of the Cuntz algebra On is studied. In particular endomorphisms which preserve the canonical diagonal MASA Dn are investigated. Conditions on a unitary in On equivalent to the fact that the corresponding endomorphism preserves Dn are found, and it is shown that they may be satisfied by unitaries which do not normalize Dn. Unitaries giving rise to endomorphisms which leave all standard MASAs invariant and have identical actions on them are characterized. Finally some properties of examples of finite-index endomorphisms of On given by Izumi and related to sector theory are discussed and it is shown that they lead to an endomorphism of O2 associated to a matrix unitary which does not preserve any standard MASA.