Add to ORKGAbstract. Given a set N with n elements and a family F of subsets, we show how to partition N into k such subsets in 2nnO(1) time. We also consider variations of this problem where the subsets may overlap or are weighted, and we solve the decision, counting, summation, and optimisation versions of these problems. Our algorithms are based on the principle of inclusion–exclusion and the zeta transform. In effect we get exact algorithms in 2nnO(1) time for several well-studied partition problems including Domatic Number, Chromatic Number, Maximum k-Cut, Bin Packing, List Colouring, and the Chromatic Polynomial. We also have applications to Bayesian learning with decision graphs and to model-based data clustering. If only polynomial space is av...
Abstract. We introduce a general approach for solving partition prob-lems where the goal is to repre...
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
AbstractMany vertex-partitioning problems can be expressed within a general framework introduced by ...
Given an n-element set U and a family of subsets S ⊆ 2 U we show how to count the number of k-partit...
Inclusion/exclusion and measure and conquer are two central techniques from the field of exact expon...
We discuss four variants of the graph colouring problem, and present algorithms for solving them. Th...
AbstractWe study the expected time complexity of two graph partitioning problems: the graph coloring...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...
AbstractWe give a complexity theoretic classification of the counting versions of so-called H-colour...
In this thesis we study algorithmic aspects of two graph partitioning problems -- graph coloring and...
Abstract. We present a deterministic algorithm producing the number of k-colourings of a graph on n ...
Abstract. A partitioning of a set of n items is a grouping of these items into k disjoint, equally s...
AbstractWe study the problem of clique-partitioning a graph. We prove a new general upper bound resu...
Given a graph with n vertices, k terminals and positive integer weights not larger than c, we comput...
. We study the computational complexity of partitioning the vertices of a graph into generalized dom...
Abstract. We introduce a general approach for solving partition prob-lems where the goal is to repre...
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
AbstractMany vertex-partitioning problems can be expressed within a general framework introduced by ...
Given an n-element set U and a family of subsets S ⊆ 2 U we show how to count the number of k-partit...
Inclusion/exclusion and measure and conquer are two central techniques from the field of exact expon...
We discuss four variants of the graph colouring problem, and present algorithms for solving them. Th...
AbstractWe study the expected time complexity of two graph partitioning problems: the graph coloring...
Consider the general partitioning (GP) problem defined as follows: Partition the vertices of a graph...
AbstractWe give a complexity theoretic classification of the counting versions of so-called H-colour...
In this thesis we study algorithmic aspects of two graph partitioning problems -- graph coloring and...
Abstract. We present a deterministic algorithm producing the number of k-colourings of a graph on n ...
Abstract. A partitioning of a set of n items is a grouping of these items into k disjoint, equally s...
AbstractWe study the problem of clique-partitioning a graph. We prove a new general upper bound resu...
Given a graph with n vertices, k terminals and positive integer weights not larger than c, we comput...
. We study the computational complexity of partitioning the vertices of a graph into generalized dom...
Abstract. We introduce a general approach for solving partition prob-lems where the goal is to repre...
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
AbstractMany vertex-partitioning problems can be expressed within a general framework introduced by ...