English

Almost sure and moment convergence for triangular P\'olya urns

Probability 2024-03-22 v2

Abstract

We consider triangular P\'olya urns and show under very weak conditions a general strong limit theorem of the form Xni/aniXiX_{ni}/a_{ni}\to \mathcal{X}_i a.s., where XniX_{ni} is the number of balls of colour ii after nn draws; the constants ania_{ni} are explicit and of the form nαlogγnn^\alpha\log^\gamma n; the limit is a.s. positive, and may be either deterministic or random, but is in general unknown. The result extends to urns with subtractions under weak conditions, but a counterexample shows that some conditions are needed. For balanced urns we also prove moment convergence in the main results if the replacements have the corresponding moments. The proofs are based on studying the corresponding continuous-time urn using martingale methods, and showing corresponding results there. We assume for convenience that all replacements have finite second moments.

Keywords

Cite

@article{arxiv.2402.01299,
  title  = {Almost sure and moment convergence for triangular P\'olya urns},
  author = {Svante Janson},
  journal= {arXiv preprint arXiv:2402.01299},
  year   = {2024}
}

Comments

84 pages. Version 2 contains new results on moment convergence, and also reduces the moment assumptions in the main theorems

R2 v1 2026-06-28T14:35:41.300Z