Partially Positive Semidefinite Maps on $*$-Semigroupoids and Linearisations
Abstract
Motivated by Cuntz-Krieger-Toeplitz systems associated to undirected graphs and representations of groupoids, we obtain a generalisation of the Sz-Nagy's Dilation Theorem for operator valued partially positive semidefinite maps on -semigroupoids with unit, with varying degrees of aggregation, firstly by -representations with unbounded operators and then we characterise the existence of the corresponding -representations by bounded operators. By linearisation of these constructions, we obtain similar results for operator valued partially positive semidefinite maps on -algebroids with unit and then, for the special case of -algebroids with unit, we obtain a generalisation of the Stinespring's Dilation Theorem. As an application of the generalisation of the Stinespring's Dilation Theorem, we show that some natural questions on -algebroids are equivalent.
Cite
@article{arxiv.2302.13107,
title = {Partially Positive Semidefinite Maps on $*$-Semigroupoids and Linearisations},
author = {Aurelian Gheondea and Bogdan Udrea},
journal= {arXiv preprint arXiv:2302.13107},
year = {2025}
}
Comments
42 pages