Add to ORKGThe analysis of classical consensus algorithms relies on contraction properties of Markov matrices with respect to the Hilbert semi-norm (infinitesimal version of Hilbert's projective metric) and to the total variation norm. We generalize these properties to the case of operators on cones. This is motivated by the study of 'non-commutative consensus', i.e., of the dynamics of linear maps leaving invariant cones of positive semi-definite matrices. Such maps appear in quantum information (Kraus maps), and in the study of matrix means. We give a characterization of the contraction rate of an abstract Markov operator on a cone, which extends classical formulæ obtained by Dœblin and Dobrushin in the case of Markov matrices. In the special case o...
Quantum probability and the theory of operator algebras are both concerned with the study of noncomm...
AbstractWe examine k-minimal and k-maximal operator spaces and operator systems, and investigate the...
We investigate some particular completely positive maps which admit a stable commutative Von Neumann...
© 2014, Springer Basel. Doeblin and Dobrushin characterized the contraction rate of Markov operators...
Also arXiv:1307.4649International audienceDoeblin and Dobrushin characterized the contraction rate o...
Arxiv: 1302:5226The analysis of classical consensus algorithms relies on contraction properties of a...
peer reviewedConvergence analysis of consensus algorithms is revisited in the light of the Hilbert d...
In this thesis we will consider Markov operators on cones . More precisely, we let X equipped with c...
Abstract. We consider the problem of computing the family of operator norms recently introduced in [...
The classical Schrödinger bridge seeks the most likely probability law for a diffusion process, in p...
AbstractThe concepts of paracontracting, pseudocontracting and nonexpanding operators have been show...
In the classical theory of Markov chains, one may study the mean time to reach some chosen state, an...
A well-known theorem of W. Arveson states that a completely positive (CP) map dominated (difference ...
The classical Schroedinger bridge seeks the most likely probability law for a diffusion process, in ...
We develop a notion of dephasing under the action of a quantum Markov semigroup in terms of converge...
Quantum probability and the theory of operator algebras are both concerned with the study of noncomm...
AbstractWe examine k-minimal and k-maximal operator spaces and operator systems, and investigate the...
We investigate some particular completely positive maps which admit a stable commutative Von Neumann...
© 2014, Springer Basel. Doeblin and Dobrushin characterized the contraction rate of Markov operators...
Also arXiv:1307.4649International audienceDoeblin and Dobrushin characterized the contraction rate o...
Arxiv: 1302:5226The analysis of classical consensus algorithms relies on contraction properties of a...
peer reviewedConvergence analysis of consensus algorithms is revisited in the light of the Hilbert d...
In this thesis we will consider Markov operators on cones . More precisely, we let X equipped with c...
Abstract. We consider the problem of computing the family of operator norms recently introduced in [...
The classical Schrödinger bridge seeks the most likely probability law for a diffusion process, in p...
AbstractThe concepts of paracontracting, pseudocontracting and nonexpanding operators have been show...
In the classical theory of Markov chains, one may study the mean time to reach some chosen state, an...
A well-known theorem of W. Arveson states that a completely positive (CP) map dominated (difference ...
The classical Schroedinger bridge seeks the most likely probability law for a diffusion process, in ...
We develop a notion of dephasing under the action of a quantum Markov semigroup in terms of converge...
Quantum probability and the theory of operator algebras are both concerned with the study of noncomm...
AbstractWe examine k-minimal and k-maximal operator spaces and operator systems, and investigate the...
We investigate some particular completely positive maps which admit a stable commutative Von Neumann...