On the ternary domain of a completely positive map on a Hilbert C*-module

Abstract

We associate to an operator valued completely positive linear map on a C -algebra A and a Hilbert C -module X over A a subset X of X, called 'ternary domain' of on X, which is a Hilbert C -module over the multiplicative domain of and every -map (i.e., associated quaternary map with ) acts on it as a ternary map. We also provide several characterizations for this set. The ternary domain \ of on A\ is a closed two-sided -ideal T of the multiplicative domain of . We show that XT =X and give several characterizations of the set X . Furthermore, we establish some relationships between X and minimal Stinespring dilation triples associate to . Finally, we show that every operator valued completely positive linear map on a C -algebra A induces a unique (in a some sense) completely positive linear map on the linking algebra of X and we determine its multiplicative domain in terms of the multiplicative domain of and the ternary domain of on X.