Reduced free products of completely positive maps and entropy for free product of automorphisms

被引:12
|
作者
Choda, M [1 ]
机构
[1] OSAKA KYOIKU UNIV,DEPT MATH,KASHIHARA,NARA 582,JAPAN
来源
PUBLICATIONS OF THE RESEARCH INSTITUTE FOR MATHEMATICAL SCIENCES | 1996年 / 32卷 / 02期
关键词
D O I
10.2977/prims/1195162968
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
The reduced free product of unital completely positive maps is defined. An invariant state on a C*-algebra for an automorphism (based on the free shift) is the composition of a state of a subalgebra with the reduced free product of expectations. Entropies for the reduced free product and the tensor product of an automorphism gamma with the free shift coincide with the entropy of gamma.
引用
收藏
页码:371 / 382
页数:12
相关论文
共 50 条
  • [21] Completely positive maps for reduced states of indistinguishable particles
    Souza, Leonardo da Silva
    Debarba, Tiago
    Braga Ferreira, Diego L.
    Iemini, Fernando
    Vianna, Reinaldo O.
    PHYSICAL REVIEW A, 2018, 98 (05)
  • [22] DYNAMIC ENTROPY OF QUASI-FREE AUTOMORPHISMS
    NARNHOFER, H
    THIRRING, W
    LETTERS IN MATHEMATICAL PHYSICS, 1987, 14 (01) : 89 - 96
  • [23] PEAK REDUCTION AND AUTOMORPHISMS OF FREE GROUPS AND FREE-PRODUCTS
    COLLINS, DJ
    ANNALS OF MATHEMATICS STUDIES, 1987, (111): : 107 - 120
  • [24] Entropy of Completely Positive Maps and Applications to Quantum Information Theory
    Fujimoto, Ichiro
    GEOMETRIC METHODS IN PHYSICS, 2016, : 25 - 34
  • [25] Free entropy dimension in amalgamated free products
    Brown, Nathanial P.
    Dykema, Kenneth J.
    Jung, Kenley
    PROCEEDINGS OF THE LONDON MATHEMATICAL SOCIETY, 2008, 97 : 339 - 367
  • [26] Automorphisms of Free Products and their Application to Multivariable Dynamics
    Ramsey, Christopher
    INDIANA UNIVERSITY MATHEMATICS JOURNAL, 2016, 65 (03) : 899 - 924
  • [27] BOUNDED CANCELLATION OF AUTOMORPHISMS OF FREE-PRODUCTS
    GOLDSTEIN, R
    LECTURE NOTES IN MATHEMATICS, 1990, 1440 : 81 - 89
  • [28] SOME REDUCED FREE PRODUCTS OF ABELIAN C*-ALGEBRAS AND SOME C*-SUBALGEBRA IN A FREE PRODUCT
    Heo, Jaeseong
    Kim, Jeong Hee
    BULLETIN OF THE KOREAN MATHEMATICAL SOCIETY, 2010, 47 (05) : 997 - 1010
  • [29] EFFICIENT REPRESENTATIVES FOR AUTOMORPHISMS OF FREE-PRODUCTS
    COLLINS, DJ
    TURNER, EC
    MICHIGAN MATHEMATICAL JOURNAL, 1994, 41 (03) : 443 - 464
  • [30] Dynamics of fully irreducible automorphisms of free products
    Papavasileiou, Ioannis
    Syrigos, Dionysios
    JOURNAL OF ALGEBRA, 2025, 664 : 904 - 939
12345