We assign a uniform probability to the set consisting of partitions of a positive integer $n$ such that the multiplicity of each summand is less than a given number $d$ and we study the limiting distribution of the number of summands in a random partition. It is known from a result by Erdős and Lehner published in 1941 that the distributions of the length in random restricted $(d=2)$ and random unrestricted $(d \geq n+1)$ partitions behave very differently. In this paper we show that as the bound $d$ increases we observe a phase transition in which the distribution goes from the Gaussian distribution of the restricted case to the Gumbel distribution of the unrestricted case
12 pages, 3 figuresInternational audienceWe study two families of probability measures on integer pa...
AbstractWe consider an integer partition λ1⩾⋯⩾λℓ, ℓ⩾1, chosen uniformly at random among all partitio...
Let Σ2n be the set of all partitions of the even integers from the interval (4, 2n], n> 2, into t...
Paper presented at Strathmore International Math Research Conference on July 23 - 27, 2012We assign ...
ABSTRACT: We consider the problem of partitioning n randomly chosen integers between 1 and 2 m into ...
Paper presented at Strathmore International Math Research Conference on July 23 - 27, 2012We study t...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...
We identify a natural parameter for random number partitioning, and show that there is a rapid trans...
We study two types of probability measures on the set of integer partitions of n with at most m part...
Dedicated to Zhengyan Lin on his sixty fifth birthday In this paper we aim to review some works on t...
AbstractWe study the random partitions of a large integern, under the assumption that all such parti...
We prove a long-standing conjecture which characterises the Ewens-Pitman twoparameter family of exch...
Let λ be a partition of an integer n chosen uniformly at random among all such partitions. Let s (λ)...
AbstractFor a given integer n, let Λn denote the set of all integer partitions λ1⩾λ2⩾…⩾λm>0 (m⩾1), o...
A partition of a positive integer n is a way of writing it as the sum of positive integers without r...
12 pages, 3 figuresInternational audienceWe study two families of probability measures on integer pa...
AbstractWe consider an integer partition λ1⩾⋯⩾λℓ, ℓ⩾1, chosen uniformly at random among all partitio...
Let Σ2n be the set of all partitions of the even integers from the interval (4, 2n], n> 2, into t...
Paper presented at Strathmore International Math Research Conference on July 23 - 27, 2012We assign ...
ABSTRACT: We consider the problem of partitioning n randomly chosen integers between 1 and 2 m into ...
Paper presented at Strathmore International Math Research Conference on July 23 - 27, 2012We study t...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...
We identify a natural parameter for random number partitioning, and show that there is a rapid trans...
We study two types of probability measures on the set of integer partitions of n with at most m part...
Dedicated to Zhengyan Lin on his sixty fifth birthday In this paper we aim to review some works on t...
AbstractWe study the random partitions of a large integern, under the assumption that all such parti...
We prove a long-standing conjecture which characterises the Ewens-Pitman twoparameter family of exch...
Let λ be a partition of an integer n chosen uniformly at random among all such partitions. Let s (λ)...
AbstractFor a given integer n, let Λn denote the set of all integer partitions λ1⩾λ2⩾…⩾λm>0 (m⩾1), o...
A partition of a positive integer n is a way of writing it as the sum of positive integers without r...
12 pages, 3 figuresInternational audienceWe study two families of probability measures on integer pa...
AbstractWe consider an integer partition λ1⩾⋯⩾λℓ, ℓ⩾1, chosen uniformly at random among all partitio...
Let Σ2n be the set of all partitions of the even integers from the interval (4, 2n], n> 2, into t...