23 pagesInternational audienceThis article presents uniform random generators of plane partitions according to the size (the number of cubes in the 3D interpretation). Combining a bijection of Pak with the method of Boltzmann sampling, we obtain random samplers that are slightly superlinear: the complexity is $O(n (\ln n)^3)$ in approximate-size sampling and $O(n^{4/3})$ in exact-size sampling (under a real-arithmetic computation model). To our knowledge, these are the first polynomial-time samplers for plane partitions according to the size (there exist polynomial-time samplers of another type, which draw plane partitions that fit inside a fixed bounding box). The same principles yield efficient samplers for $(a\times b)$-boxed plane parti...
A sweep-plane algorithm by Lawrence for convex polytope computation is adapted to generate random tu...
In the monomer-dimer model on a graph, each matching (collection of non-overlapping edges) ${M$ has ...
Boltzmann models from statistical physics combined with methods from analytic combinatorics give ris...
23 pagesInternational audienceThis article presents uniform random generators of plane partitions ac...
Abstract: The combination of divide-and-conquer and random sampling has proven very effective in the...
AbstractWe introduce discrete time Markov chains that preserve uniform measures on boxed plane parti...
This extended abstract introduces a new algorithm for the random generation of labelled planar graph...
26 pages, 19 figures, version finaleInternational audienceWe describe random generation algorithms f...
We study the asymptotic behavior of the largest part size of a plane partition ω of the positive int...
<p><strong>Topic:</strong> generating uniform random samples from the set of all integer partitions ...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...
We introduce a new randomized sampling technique, called Polling which has applications to deriving ...
This article proposes a surprisingly simple framework for the random generation of combinatorial con...
This note proposes a new framework for random generation of combinatorial configurations based on wh...
55 pagesThis article introduces new algorithms for the uniform random generation of labelled planar ...
A sweep-plane algorithm by Lawrence for convex polytope computation is adapted to generate random tu...
In the monomer-dimer model on a graph, each matching (collection of non-overlapping edges) ${M$ has ...
Boltzmann models from statistical physics combined with methods from analytic combinatorics give ris...
23 pagesInternational audienceThis article presents uniform random generators of plane partitions ac...
Abstract: The combination of divide-and-conquer and random sampling has proven very effective in the...
AbstractWe introduce discrete time Markov chains that preserve uniform measures on boxed plane parti...
This extended abstract introduces a new algorithm for the random generation of labelled planar graph...
26 pages, 19 figures, version finaleInternational audienceWe describe random generation algorithms f...
We study the asymptotic behavior of the largest part size of a plane partition ω of the positive int...
<p><strong>Topic:</strong> generating uniform random samples from the set of all integer partitions ...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...
We introduce a new randomized sampling technique, called Polling which has applications to deriving ...
This article proposes a surprisingly simple framework for the random generation of combinatorial con...
This note proposes a new framework for random generation of combinatorial configurations based on wh...
55 pagesThis article introduces new algorithms for the uniform random generation of labelled planar ...
A sweep-plane algorithm by Lawrence for convex polytope computation is adapted to generate random tu...
In the monomer-dimer model on a graph, each matching (collection of non-overlapping edges) ${M$ has ...
Boltzmann models from statistical physics combined with methods from analytic combinatorics give ris...