AbstractIn a recent paper, Amini et al. introduced a general framework to prove duality theorems between tree-decompositions and their dual combinatorial object. They unify all known ad hoc proofs in one duality theorem based on submodular partition functions. This general theorem remains however a bit technical and relies on this particular submodularity property. Instead of partition functions, we propose here a simple combinatorial property of a set of partitions which also gives these duality results. Our approach is both simpler, and a little bit more general
AbstractOne basic activity in combinatorics is to establish combinatorial identities by so-called ‘b...
Focusing on a very active area of mathematical research in the last decade, Combinatorics of Set Par...
AbstractThere are several examples in linear algebra and number theory of theorems which are formall...
AbstractIn a recent paper, Amini et al. introduced a general framework to prove duality theorems bet...
International audienceIn a recent paper, Amini et al. introduce a general framework to prove duality...
AbstractAdapting the method introduced in Graph Minors X, we propose a new proof of the duality betw...
International audienceAdapting the method introduced in Graph Minors X, we propose a new proof of th...
Adapting the method introduced in Graph Minors X [6], we propose a new proof of the duality between ...
Modern categorical logic as well as the Kripke and topological models of intuitionistic logic sugges...
The notion of submodular partition functions generalizes many of well-known tree decompositions of g...
Partitions on a set are dual to subsets of a set in the sense of the category-theoretic duality of e...
A partition of a set A is a set of nonempty pairwise disjoint subsets of A whose union is A. An equi...
AbstractWe show that for a set F of forbidden set partitions and an integer k there is a finite coll...
Let A be a set and let A be a collection of subsets of A. Conditions are given that must hold if a p...
Our goal in this paper is to illustrate the idea of combinatorial duality: the combinatorial manifes...
AbstractOne basic activity in combinatorics is to establish combinatorial identities by so-called ‘b...
Focusing on a very active area of mathematical research in the last decade, Combinatorics of Set Par...
AbstractThere are several examples in linear algebra and number theory of theorems which are formall...
AbstractIn a recent paper, Amini et al. introduced a general framework to prove duality theorems bet...
International audienceIn a recent paper, Amini et al. introduce a general framework to prove duality...
AbstractAdapting the method introduced in Graph Minors X, we propose a new proof of the duality betw...
International audienceAdapting the method introduced in Graph Minors X, we propose a new proof of th...
Adapting the method introduced in Graph Minors X [6], we propose a new proof of the duality between ...
Modern categorical logic as well as the Kripke and topological models of intuitionistic logic sugges...
The notion of submodular partition functions generalizes many of well-known tree decompositions of g...
Partitions on a set are dual to subsets of a set in the sense of the category-theoretic duality of e...
A partition of a set A is a set of nonempty pairwise disjoint subsets of A whose union is A. An equi...
AbstractWe show that for a set F of forbidden set partitions and an integer k there is a finite coll...
Let A be a set and let A be a collection of subsets of A. Conditions are given that must hold if a p...
Our goal in this paper is to illustrate the idea of combinatorial duality: the combinatorial manifes...
AbstractOne basic activity in combinatorics is to establish combinatorial identities by so-called ‘b...
Focusing on a very active area of mathematical research in the last decade, Combinatorics of Set Par...
AbstractThere are several examples in linear algebra and number theory of theorems which are formall...