Realization of conditionally monotone independence and monotone products of completely positive maps (Q2919626)

The paper deals with monotone independence and conditional monotone independence. Monotone probability is being built parallel to free probability by introducing monotone counterparts of basic tools of free probability theory, such as full Fock space, \(R\)- and \(S\)-transforms etc. One such notion, introduced by Bożejko and Speicher, is conditional freeness. The corresponding monotone notion has been introduced by \textit{T. Hasebe} [Infin. Dimens. Anal. Quantum Probab. Relat. Top. 14, no. 3, 465--516 (2011; Zbl 1234.46053)]. The present paper refines some of the constructions presented in Hasebe's paper and adds some more results. In particular, it is shown how to model conditionally monotone independence using monotone Fock spaces, how to construct monotone products of maps and how to define monotone products of \(C^*\)-algebras with conditional expectations. It is shown that the monotone product of completely positive maps is completely positive.