Uniqueness and mixing properties of Doeblin measures
成果类型:
Article; Early Access
署名作者:
Berger, Noam; Conache, Diana; Johansson, Anders; Oberg, Anders
署名单位:
Technical University of Munich; University of Gavle; Uppsala University
刊物名称:
PROBABILITY THEORY AND RELATED FIELDS
ISSN/ISSBN:
0178-8051
DOI:
10.1007/s00440-024-01356-3
发表日期:
2025
关键词:
square summability
nonuniqueness
chains
CONVERGENCE
connections
operator
摘要:
In this paper we solve two open problems in ergodic theory. We prove first that if a Doeblin function g (a g-function) satisfies lim sup(n ->infinity)var(n)log g / n(-1/2 )<2, then we have a unique Doeblin measure (g-measure). This result indicates a possible phase transition in analogy with the long-range Ising model. Secondly, we provide an example of a Doeblin function with a unique Doeblin measure that is not weakly mixing, which implies that the sequence of iterates of the transfer operator does not converge, solving a well-known folklore problem in ergodic theory. Previously it was only known that uniqueness does not imply the Bernoulli property.
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