On some properties of a set of probability measures

## Abstract Let __P__ be a Markov kernel defined on a measurable space (__X__, 𝒜). A __P__‐ergodic probability is an extreme point of the family of all __P__‐invariant probability measures on 𝒜. Several characterizations of __P__‐ergodic probabilities are given. In particular, for the special case

Based on the axiom deÿnition of distance measure, some new formulas of fuzzy entropy induced by distance measure and some new properties of distance measure are given. A characterization of a -distance measure is a metric deÿned on all fuzzy sets is obtained.

Let p be a probability measure on 2 x 2 stochastic matrices with finite support such that the sequence pn 3 the nth convolution power of p, weakly converges to a probability measure X whose support consists of 2 x 2 stochastic matrices with identical rows. The probability measure A can, therefore, b

In This New Edition, Patrick Billingsley Updates His Classic Work Convergence Of Probability Measures To Reflect Developments Of The Past Thirty Years. Dr. Billingsley Presents A Clear, Precise, Up-to-date Account Of Probability Limit Theory In Metric Spaces. He Incorporates Many Examples And Applic