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Expansive Multisets: Asymptotic Enumeration

Probability 2022-03-30 v1 Combinatorics

Abstract

Consider a non-negative sequence cn=h(n)nα1ρnc_n = h(n) \cdot n^{\alpha-1} \cdot \rho^{-n}, where hh is slowly varying, α>0\alpha>0, 0<ρ<10<\rho<1 and nNn\in\mathbb{N}. We investigate the coefficients of G(x,y)=k1(1xky)ckG(x,y) = \prod_{k\ge1}(1-x^ky)^{-c_k}, which is the bivariate generating series of the multiset construction of combinatorial objects. By a powerful blend of probabilistic methods based on the Boltzmann model and analytic techniques exploiting the well-known saddle-point method we determine the number of multisets of total size nn with NN components, that is, the coefficient of xnyNx^ny^N in G(x,y)G(x,y), asymptotically as nn\to\infty and for all ranges of NN. Our results reveal a phase transition in the structure of the counting formula that depends on the ratio n/Nn/N and that demonstrates a prototypical passage from a bivariate local limit to an univariate one.

Keywords

Cite

@article{arxiv.2203.15543,
  title  = {Expansive Multisets: Asymptotic Enumeration},
  author = {Konstantinos Panagiotou and Leon Ramzews},
  journal= {arXiv preprint arXiv:2203.15543},
  year   = {2022}
}
R2 v1 2026-06-24T10:30:06.130Z