Schoenberg correspondence for k-(super)positive maps on matrix algebras
Article Type
Research Article
Publication Title
Positivity
Abstract
We prove a Schoenberg-type correspondence for non-unital semigroups which generalizes an analogous result for unital semigroup proved by Schürmann (in: Quantum probability and applications II, proceedings of a 2nd workshop, Heidelberg/Germany 1984, lecture notes in mathematics, vol 1136, pp 475–492, 1985). It characterizes the generators of semigroups of linear maps on Mn(C) which are k-positive, k-superpositive, or k-entanglement breaking. As a corollary we reprove Lindblad, Gorini, Kossakowski, Sudarshan’s theorem (J Math Phys 17:821, 1976; Commun Math Phys 48:119-130, 1976). We present some concrete examples of semigroups of operators and study how their positivity properties can improve with time.
DOI
https://10.1007/s11117-023-01003-6
Publication Date
9-1-2023
Recommended Citation
Bhat, B. V.Rajarama; Chakraborty, Purbayan; and Franz, Uwe, "Schoenberg correspondence for k-(super)positive maps on matrix algebras" (2023). Journal Articles. 3592.
https://digitalcommons.isical.ac.in/journal-articles/3592