论文信息 - Commuting measure-preserving transformations

Commuting measure-preserving transformations

AbstractLet φ1, ... ,φd be commuting measure-preserving transformations, $$ \phi ^l \equiv \phi _1^{l_1 } \phi _2^{l_2 } \cdot \cdot \cdot \phi _d^{l_d } ,\Phi = \left\{ {\phi ^l } \right\} $$ . The Kakutani-Rokhlin tower theorem is proved in a refined form for non-periodic groups Φ, and the Shannon-McMillan theorem is extended to ergodic groups. These results are used to extend recent isomorphism results to groups of transformations.

Benjamin Weiss | Yitzhak Katznelson | Y. Katznelson | B. Weiss

[1] Meir Smorodinsky,et al. Ergodic Theory Entropy , 1971 .

[2] F. Smithies. Linear Operators , 2019, Nature.

[3] D. Ornstein. Factors of Bernoulli shifts are Bernoulli shifts , 1970 .

[4] P. Halmos. Lectures on ergodic theory , 1956 .

[5] D. Ornstein. Two Bernoulli shifts with infinite entropy are isomorphic , 1970 .

[6] Wolfgang Krieger,et al. On entropy and generators of measure-preserving transformations , 1970 .

[7] B. Weiss. The isomorphism problem in ergodic theory , 1972 .

[8] D. Ornstein. Bernoulli shifts with the same entropy are isomorphic , 1970 .

[9] V. Rokhlin. LECTURES ON THE ENTROPY THEORY OF MEASURE-PRESERVING TRANSFORMATIONS , 1967 .