AbstractTriesch (1997) [25] conjectured that Hall’s classical theorem on matchings in bipartite graphs is a special case of a phenomenon of monotonicity for the number of matchings in such graphs. We prove this conjecture for all graphs with sufficiently many edges by deriving an explicit monotonic formula counting matchings in bipartite graphs.This formula follows from a general duality theory which we develop for counting matchings. Moreover, we make use of generating functions for set functions as introduced by Lass [20], and we show how they are useful for counting matchings in bipartite graphs in many different ways
AbstractThe number of matchings of a graph G is an important graph parameter in various contexts, no...
. A cellular graph is a graph whose edges can be partitioned into 4-cycles (called cells) so that ea...
Abstract. Let G be a graph on n vertices. A perfect matching of the vertices of G is a collection of...
International audienceTriesch (1997) [25] conjectured that Hall's classical theorem on matchings in ...
In this paper we present some elementary results on the matching number of bipartite graphs. Most of...
A famous theorem of P. Hall gives a necessary and sufficient condition for a bipartite graph $\Gamma...
With the modern proliferation of real-world networks, the almost quarter-millenium-old subject of gr...
Abstract. We introduce a class of graphs called compound graphs, which are constructed out of copies...
We show that the number of k-matching in a given undirected graph G is equal to the number of perfec...
AbstractWe give lower and upper bounds for the number of reducible ears as well as upper bounds for ...
Two bipartite graphs $G_1$ = ($V_1=S_1$\cup$T_1,E_1$) $G_2$ = ($V_2 = S_2$\cup$T_2,E_2$) in which th...
Abstract. A cellular graph is a graph whose edges can be partitioned into 4-cycles (called cells) so...
The problem of devising an algorithm for counting the number of perfect matchings in bipartite graph...
If $G$ is a bipartite graph, Hall's theorem \cite{H35} gives a condition for the existence of a matc...
In this thesis we adapt fundamental parts of the Graph Minors series of Robertson and Seymour for th...
AbstractThe number of matchings of a graph G is an important graph parameter in various contexts, no...
. A cellular graph is a graph whose edges can be partitioned into 4-cycles (called cells) so that ea...
Abstract. Let G be a graph on n vertices. A perfect matching of the vertices of G is a collection of...
International audienceTriesch (1997) [25] conjectured that Hall's classical theorem on matchings in ...
In this paper we present some elementary results on the matching number of bipartite graphs. Most of...
A famous theorem of P. Hall gives a necessary and sufficient condition for a bipartite graph $\Gamma...
With the modern proliferation of real-world networks, the almost quarter-millenium-old subject of gr...
Abstract. We introduce a class of graphs called compound graphs, which are constructed out of copies...
We show that the number of k-matching in a given undirected graph G is equal to the number of perfec...
AbstractWe give lower and upper bounds for the number of reducible ears as well as upper bounds for ...
Two bipartite graphs $G_1$ = ($V_1=S_1$\cup$T_1,E_1$) $G_2$ = ($V_2 = S_2$\cup$T_2,E_2$) in which th...
Abstract. A cellular graph is a graph whose edges can be partitioned into 4-cycles (called cells) so...
The problem of devising an algorithm for counting the number of perfect matchings in bipartite graph...
If $G$ is a bipartite graph, Hall's theorem \cite{H35} gives a condition for the existence of a matc...
In this thesis we adapt fundamental parts of the Graph Minors series of Robertson and Seymour for th...
AbstractThe number of matchings of a graph G is an important graph parameter in various contexts, no...
. A cellular graph is a graph whose edges can be partitioned into 4-cycles (called cells) so that ea...
Abstract. Let G be a graph on n vertices. A perfect matching of the vertices of G is a collection of...