AbstractMany random combinatorial objects have a component structure whose joint distribution is equal to that of a process of mutually independent random variables, conditioned on the value of a weighted sum of the variables. It is interesting to compare the combinatorial structure directly to the independent discrete process, without renormalizing. The quality of approximation can often be conveniently quantified in terms of total variation distance, for functionals which observe part, but not all, of the combinatorial and independent processes. Among the examples are combinatorial assemblies (e.g., permutations, random mapping functions, and partitions of a set), multisets (e.g., polynomials over a finite field, mapping patterns and part...
Models for random permutations with nonuniform probability distribution are ubiq-uitous in many bran...
This is an informal discussion on one of the basic problems in the theory of empirical proc...
Abstract. We provide an introduction to the analysis of random combinatorial structures and some of ...
AbstractMany random combinatorial objects have a component structure whose joint distribution is equ...
Discrete functional limit theorems, which give independent process approximations for the joint dist...
AbstractThe class of problems involving the random generation of combinatorial structures from a uni...
AbstractStandard fare in the study of representations and decompositions of processes with independe...
Our results are concerned with couplings, component counts of combinatorial objects, andprobabilisti...
For many combinatorial objects we can associate a natural probability distribution on the members of...
Summary Approximate sampling from combinatorially-defined sets, using the Markov chain Monte Carlo m...
We consider random monic polynomials of degree n over a finite field of q elements, chosen with all ...
This article describes and compares methods for simulating the component counts of random logarithmi...
When approximating the joint distribution of the component counts of a decomposable combinatorial st...
AbstractThis paper studies the distribution of the component spectrum of combinatorial structures su...
Using techniques from Poisson approximation, we prove explicit error boundson the number of permutat...
Models for random permutations with nonuniform probability distribution are ubiq-uitous in many bran...
This is an informal discussion on one of the basic problems in the theory of empirical proc...
Abstract. We provide an introduction to the analysis of random combinatorial structures and some of ...
AbstractMany random combinatorial objects have a component structure whose joint distribution is equ...
Discrete functional limit theorems, which give independent process approximations for the joint dist...
AbstractThe class of problems involving the random generation of combinatorial structures from a uni...
AbstractStandard fare in the study of representations and decompositions of processes with independe...
Our results are concerned with couplings, component counts of combinatorial objects, andprobabilisti...
For many combinatorial objects we can associate a natural probability distribution on the members of...
Summary Approximate sampling from combinatorially-defined sets, using the Markov chain Monte Carlo m...
We consider random monic polynomials of degree n over a finite field of q elements, chosen with all ...
This article describes and compares methods for simulating the component counts of random logarithmi...
When approximating the joint distribution of the component counts of a decomposable combinatorial st...
AbstractThis paper studies the distribution of the component spectrum of combinatorial structures su...
Using techniques from Poisson approximation, we prove explicit error boundson the number of permutat...
Models for random permutations with nonuniform probability distribution are ubiq-uitous in many bran...
This is an informal discussion on one of the basic problems in the theory of empirical proc...
Abstract. We provide an introduction to the analysis of random combinatorial structures and some of ...