English

The weighted words collector

Discrete Mathematics 2012-04-18 v2

Abstract

Motivated by applications in bioinformatics, we consider the word collector problem, i.e. the expected number of calls to a random weighted generator of words of length nn before the full collection is obtained. The originality of this instance of the non-uniform coupon collector lies in the, potentially large, multiplicity of the words/coupons of a given probability/composition. We obtain a general theorem that gives an asymptotic equivalent for the expected waiting time of a general version of the Coupon Collector. This theorem is especially well-suited for classes of coupons featuring high multiplicities. Its application to a given language essentially necessitates some knowledge on the number of words of a given composition/probability. We illustrate the application of our theorem, in a step-by-step fashion, on three exemplary languages, revealing asymptotic regimes in Θ(μ(n)n)\Theta(\mu(n)\cdot n) and Θ(μ(n)logn)\Theta(\mu(n)\cdot \log n), where μ(n)\mu(n) is the sum of weights over words of length nn.

Keywords

Cite

@article{arxiv.1202.0920,
  title  = {The weighted words collector},
  author = {Jérémie Du Boisberranger and Danièle Gardy and Yann Ponty},
  journal= {arXiv preprint arXiv:1202.0920},
  year   = {2012}
}
R2 v1 2026-06-21T20:14:54.430Z