Quantum $U$-channels on $S$-spaces
Abstract
If the symmetry, (an operator satisfying ) which defines the Krein space, is replaced by a (not necessarily self-adjoint) unitary, then we have the notion of an -space which was introduced by Szafraniec. In this paper, we consider -spaces and study the structure of completely -positive maps between the algebras of bounded linear operators. We first give a Stinespring-type representation for a completely -positive map. On the other hand, we introduce Choi -matrix of a linear map and establish the equivalence of the Kraus -decompositions and Choi -matrices. Then we study properties of nilpotent completely -positive maps. We develop the -PPT criterion for separability of quantum -states and discuss the entanglement breaking condition of quantum -channels and explore -PPT squared conjecture. Finally, we give concrete examples of completely -positive maps and examples of quantum -states which are -entangled and -separable.
Cite
@article{arxiv.2404.18160,
title = {Quantum $U$-channels on $S$-spaces},
author = {Priyabrata Bag and Azad Rohilla and Harsh Trivedi},
journal= {arXiv preprint arXiv:2404.18160},
year = {2024}
}
Comments
22 pages