On a complex-analytic approach to classifying stationary measures on $S^1$ with respect to the countably supported measures on $PSU(1,1)$

Autor: Kosenko, Petr
Rok vydání: 2024
Předmět:
Druh dokumentu: Working Paper
Popis: We provide a complex-analytic approach to the classification of positive stationary measures on $S^1$ with respect to complex finite Borel measures on $PSU(1,1)$ satisfying the finite first moment condition by studying their Poisson-like and Cauchy-like transforms from the perspective of generalized analytic continuation. This approach allows us to establish a functional-analytic criterion for singularity of a hitting measure for random walks on lattices in $PSU(1,1)$. In addition, this approach suggests alternative proofs to the several well-known related results by Furstenberg, Kaimanovich, Guivarc'h-le Jan and Bourgain, among several others.
Comment: 20 pages
Databáze: arXiv