In a two-capacitated spanning tree of a complete graph with a distinguished root vertex v, every component of the induced subgraph on V\{v} has at most two vertices. We give a complete,non-redundant characterization of the polytope defined by the convex hull of the incidence vectors of two-capacitated spanning trees. This polytope is the intersection of the spanning tree polytope on the given graph and the matching polytope on the subgraph induced by removing the root node and its incident edges. This result is one of very few known cases in which the intersection of two integer polyhedra yields another integer polyhedron. We also give a complete polyhedral characterization of a related polytope, the 2-capacitated forest polytope
AbstractThis paper gives an elementary, inductive proof-“graphical” in spirit-of a theorem of Edmond...
We consider, for complete bipartite graphs, the convex hulls of characteristic vectors of all matchi...
This paper studies the problem of finding a two-edge connected spanning subgraph of minimum weight. ...
We study the polyhedral structure of two related core combinatorial problems: the subtree cardinalit...
AbstractThe problem of finding a two-connected planar spanning subgraph of maximum weight in a compl...
AbstractWe further study some known families of valid inequalities for the 2-edge-connected and 2-no...
We address the question to what extent polyhedral knowledge about individual knapsack constraints ...
International audienceGiven an undirected simple graph G=(V,E) and integer values f(v) for each node...
AbstractThe matching polyhedron, i.e., the convex hull of (incidence vectors of) perfect matchings o...
The problem of finding in a complete edge-weighted graph a two-connected planar spanning subgraph of...
AbstractA short proof of Edmonds' matching polyhedron theorem and the total dual integrality of the ...
AbstractThis paper considers a generalization of the capacitated spanning tree problem, in which som...
Consider a connected graph G and let T be a spanning tree of G. Every edge e∈G−T induces a cycle in ...
Let G = (V, E) be an undirected graph where the edges in E have non-negative weights. A star in G is...
AbstractWe define general Laman (count) conditions for edges and faces of polygonal partitions in th...
AbstractThis paper gives an elementary, inductive proof-“graphical” in spirit-of a theorem of Edmond...
We consider, for complete bipartite graphs, the convex hulls of characteristic vectors of all matchi...
This paper studies the problem of finding a two-edge connected spanning subgraph of minimum weight. ...
We study the polyhedral structure of two related core combinatorial problems: the subtree cardinalit...
AbstractThe problem of finding a two-connected planar spanning subgraph of maximum weight in a compl...
AbstractWe further study some known families of valid inequalities for the 2-edge-connected and 2-no...
We address the question to what extent polyhedral knowledge about individual knapsack constraints ...
International audienceGiven an undirected simple graph G=(V,E) and integer values f(v) for each node...
AbstractThe matching polyhedron, i.e., the convex hull of (incidence vectors of) perfect matchings o...
The problem of finding in a complete edge-weighted graph a two-connected planar spanning subgraph of...
AbstractA short proof of Edmonds' matching polyhedron theorem and the total dual integrality of the ...
AbstractThis paper considers a generalization of the capacitated spanning tree problem, in which som...
Consider a connected graph G and let T be a spanning tree of G. Every edge e∈G−T induces a cycle in ...
Let G = (V, E) be an undirected graph where the edges in E have non-negative weights. A star in G is...
AbstractWe define general Laman (count) conditions for edges and faces of polygonal partitions in th...
AbstractThis paper gives an elementary, inductive proof-“graphical” in spirit-of a theorem of Edmond...
We consider, for complete bipartite graphs, the convex hulls of characteristic vectors of all matchi...
This paper studies the problem of finding a two-edge connected spanning subgraph of minimum weight. ...