Add to ORKGIt is well known that Hall's transformation factorizes into a composition of two isometric maps to and from a certain completion of the dual of the universal enveloping algebra of the Lie algebra of the initial Lie group. In this paper this fact will be demonstrated by exhibiting each of the maps in turn as the composition of two isometries. For the first map we use classical stochastic calculus, and in particular a stochastic analogue of the Dyson perturbation expansion. For the second map we make use of quantum stochastic calculus, in which the circumambient space is the complexification of the Lie algebra equipped with the ad-invariant inner product
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
An Introduction to Quantum Stochastic Calculus aims to deepen our understanding of the dynamics of s...
This monograph takes as starting point that abstract quantum stochastic processes can be understood ...
We first study a class of fundamental quantum stochastic processes induced by the generators of a si...
ABSTRACT. The basic integrator processes of quantum stochastic calcu-lus, namely, creation, conserva...
Stochastic matrices and positive maps in matrix algebras have proved to be very important tools for...
Stochastic matrices and positive maps in matrix algebras have proved to be very important tools for...
Stochastic matrices and positive maps in matrix algebras have proved to be very important tools for...
We study densely defined unbounded operators acting between different Hilbert spaces. For these, we ...
We develop the theory of chaos spaces and chaos matrices. A chaos space is a Hilbert space with a fi...
From the notion of stochastic Hamiltonians and the flows that they generate, we present an account o...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
We discuss pairs (phi, Phi) of maps, where phi is a map between C*-algebras and Phi is a phi-module ...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
An Introduction to Quantum Stochastic Calculus aims to deepen our understanding of the dynamics of s...
This monograph takes as starting point that abstract quantum stochastic processes can be understood ...
We first study a class of fundamental quantum stochastic processes induced by the generators of a si...
ABSTRACT. The basic integrator processes of quantum stochastic calcu-lus, namely, creation, conserva...
Stochastic matrices and positive maps in matrix algebras have proved to be very important tools for...
Stochastic matrices and positive maps in matrix algebras have proved to be very important tools for...
Stochastic matrices and positive maps in matrix algebras have proved to be very important tools for...
We study densely defined unbounded operators acting between different Hilbert spaces. For these, we ...
We develop the theory of chaos spaces and chaos matrices. A chaos space is a Hilbert space with a fi...
From the notion of stochastic Hamiltonians and the flows that they generate, we present an account o...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
We discuss pairs (phi, Phi) of maps, where phi is a map between C*-algebras and Phi is a phi-module ...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
An Introduction to Quantum Stochastic Calculus aims to deepen our understanding of the dynamics of s...
This monograph takes as starting point that abstract quantum stochastic processes can be understood ...