AbstractGiven a C∗-algebra acted upon by a group of automorphisms, we study quite general conditions which allow to deduce the main properties of asymptotically abelian systems, of interest in Quantum Statistical Mechanics. For von Neumann algebras, our conditions imply in particular the existence of a unique normal invariant projection onto the fixed points of the center.We also describe the interrelations between the main notions of asymptotic abelianness so far introduced
Abstract. Starting with a unit-preserving normal completely positive map L: M → M acting on a von Ne...
© 2020, PleiadesT Publishing,T Ltd. Abstract—This paper deals with properties of the ultraproducts f...
A notion of entropy of a normal state on a finite von Neumann algebra in Segal’s sense is considered...
AbstractGiven a C∗-algebra acted upon by a group of automorphisms, we study quite general conditions...
Five conceptually distinct notions of symmetry in quantum theory are studied in the algebraic settin...
Abstract. We study some properties of invariant states on a C*-algebra ~ with a group G of automorph...
Let (A,α) be a C∗-dynamical system. We introduce the notion of pressure Pα(H) of the automorphism α ...
The crossed product construction is used to control in some examples the asymptotic behaviour of tim...
summary:It is shown that every von Neumann algebra whose centre determines the state space is alread...
AbstractLet M be a von Neumann algebra with normal states φ and ω, and let αi:Ai → M be a net of pos...
Preliminary version. Comments are welcomeThe Asymptotic Equipartition Property (AEP) in information ...
Consider the Chern-Simons topological quantum field theory with gauge group SU2 and level k. Given a...
Given an abelian group G endowed with a T=R/Z-pre-symplectic form, we assign to it a symplectic twis...
47 pages, 2 figuresConsider the Chern-Simons topological quantum field theory with gauge group SU(2)...
AbstractWe consider a class of quantum dissipative semigroup on a von-Neumann algebra which admits a...
Abstract. Starting with a unit-preserving normal completely positive map L: M → M acting on a von Ne...
© 2020, PleiadesT Publishing,T Ltd. Abstract—This paper deals with properties of the ultraproducts f...
A notion of entropy of a normal state on a finite von Neumann algebra in Segal’s sense is considered...
AbstractGiven a C∗-algebra acted upon by a group of automorphisms, we study quite general conditions...
Five conceptually distinct notions of symmetry in quantum theory are studied in the algebraic settin...
Abstract. We study some properties of invariant states on a C*-algebra ~ with a group G of automorph...
Let (A,α) be a C∗-dynamical system. We introduce the notion of pressure Pα(H) of the automorphism α ...
The crossed product construction is used to control in some examples the asymptotic behaviour of tim...
summary:It is shown that every von Neumann algebra whose centre determines the state space is alread...
AbstractLet M be a von Neumann algebra with normal states φ and ω, and let αi:Ai → M be a net of pos...
Preliminary version. Comments are welcomeThe Asymptotic Equipartition Property (AEP) in information ...
Consider the Chern-Simons topological quantum field theory with gauge group SU2 and level k. Given a...
Given an abelian group G endowed with a T=R/Z-pre-symplectic form, we assign to it a symplectic twis...
47 pages, 2 figuresConsider the Chern-Simons topological quantum field theory with gauge group SU(2)...
AbstractWe consider a class of quantum dissipative semigroup on a von-Neumann algebra which admits a...
Abstract. Starting with a unit-preserving normal completely positive map L: M → M acting on a von Ne...
© 2020, PleiadesT Publishing,T Ltd. Abstract—This paper deals with properties of the ultraproducts f...
A notion of entropy of a normal state on a finite von Neumann algebra in Segal’s sense is considered...
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