English

Krengel-Lin decomposition for probability measures on hypergroups

Probability 2007-05-23 v1 Functional Analysis

Abstract

A Markov operator PP on a σ\sigma-finite measure space (X,Σ,m)(X, \Sigma, m) with invariant measure mm is said to have Krengel-Lin decomposition if L2(X)=E0L2(X,Σd)L^2 (X) = E_0 \oplus L^2 (X,\Sigma_d) where E0={fL2(X)Pn(f)\ra0}E_0 = \{f \in L^2 (X) \mid ||P^n (f) || \ra 0 \} and Σd\Sigma_d is the deterministic σ\sigma -field of PP. We consider convolution operators and we show that a measure \lam\lam on a hypergroup has Krengel-Lin decomposition if and only if the sequence (\lamˇn\lamn)(\check \lam ^n *\lam ^n) converges to an idempotent or \lam\lam is scattered. We verify this condition for probabilities on Tortrat groups, on commutative hypergroups and on central hypergroups. We give a counter-example to show that the decomposition is not true for measures on discrete hypergroups which is in contrast to the discrete groups case.

Keywords

Cite

@article{arxiv.math/0212285,
  title  = {Krengel-Lin decomposition for probability measures on hypergroups},
  author = {C. R. E. Raja},
  journal= {arXiv preprint arXiv:math/0212285},
  year   = {2007}
}