International audienceAdapting the method introduced in Graph Minors X, we propose a new proof of the duality between the bramble number of a graph and its tree-width. Our approach is based on a new definition of submodularity on partition functions which naturally extends the usual one on set functions. The proof does not rely on Menger's theorem, and thus generalises the original one. It thus provides a dual for matroid tree-width. One can also derive all known dual notions of other classical width-parameters from it
For a positive integer k, a k-subdominating function of a graph G =(V,E) is a function f:V →{−1; 1} ...
AbstractFor a positive integer k, a k-subdominating function of a graph G=(V,E) is a function f:V→{−...
In this thesis, we study some width parameters on graphs, beyond tree-width and clique-width. Our fi...
AbstractAdapting the method introduced in Graph Minors X, we propose a new proof of the duality betw...
Adapting the method introduced in Graph Minors X [6], we propose a new proof of the duality between ...
International audienceAdapting the method introduced in Graph Minors X, we propose a new proof of th...
The notion of submodular partition functions generalizes many of well-known tree decompositions of g...
We apply a recent tangle-tree duality theorem in abstract separation systems to derive tangle-tree-t...
AbstractIn a recent paper, Amini et al. introduced a general framework to prove duality theorems bet...
AbstractWe describe various aspects of the use of submodular functions in graph theory. New proofs o...
Abstract. We construct a polynomial-time algorithm to approximate the branch-width of certain symmet...
AbstractA bramble in a graph G is a family of connected subgraphs of G such that any two of these su...
We prove a general duality theorem for tangle-like dense objects in com-binatorial structures such a...
AbstractWe define the notions tree-depth and upper chromatic number of a graph and show their releva...
Submodular functions are the functions that frequently appear in connection with many combi-natorial...
For a positive integer k, a k-subdominating function of a graph G =(V,E) is a function f:V →{−1; 1} ...
AbstractFor a positive integer k, a k-subdominating function of a graph G=(V,E) is a function f:V→{−...
In this thesis, we study some width parameters on graphs, beyond tree-width and clique-width. Our fi...
AbstractAdapting the method introduced in Graph Minors X, we propose a new proof of the duality betw...
Adapting the method introduced in Graph Minors X [6], we propose a new proof of the duality between ...
International audienceAdapting the method introduced in Graph Minors X, we propose a new proof of th...
The notion of submodular partition functions generalizes many of well-known tree decompositions of g...
We apply a recent tangle-tree duality theorem in abstract separation systems to derive tangle-tree-t...
AbstractIn a recent paper, Amini et al. introduced a general framework to prove duality theorems bet...
AbstractWe describe various aspects of the use of submodular functions in graph theory. New proofs o...
Abstract. We construct a polynomial-time algorithm to approximate the branch-width of certain symmet...
AbstractA bramble in a graph G is a family of connected subgraphs of G such that any two of these su...
We prove a general duality theorem for tangle-like dense objects in com-binatorial structures such a...
AbstractWe define the notions tree-depth and upper chromatic number of a graph and show their releva...
Submodular functions are the functions that frequently appear in connection with many combi-natorial...
For a positive integer k, a k-subdominating function of a graph G =(V,E) is a function f:V →{−1; 1} ...
AbstractFor a positive integer k, a k-subdominating function of a graph G=(V,E) is a function f:V→{−...
In this thesis, we study some width parameters on graphs, beyond tree-width and clique-width. Our fi...