Add to ORKGAbstract. Kirchhoff’s matrix tree theorem is a well-known result that gives a formula for the number of spanning trees in a finite, connected graph in terms of the graph Laplacian matrix. A closely related result is Wilson’s algorithm for putting the uniform distribution on the set of spanning trees. We will show that when one follows Greg Lawler’s strategy for proving Wilson’s algorithm, Kirchhoff’s theorem follows almost immediately after one applies some elementary linear algebra. We also show that the same ideas can be applied to other computations related to general Markov chains and processes on a finite state space. 1
We consider generalizations of Schuetzenberger's promotion operator on the set L of linear extension...
We consider generalizations of Schuetzenberger's promotion operator on the set L of linear extension...
International audienceIf G is a strongly connected finite directed graph, the set T G of rooted dire...
Kirchhoff's Matrix Tree Theorem permits the calculation of the number of spanning trees in any given...
AbstractOne of the classical results in graph theory is the matrix-tree theorem which asserts that t...
In this thesis we study the number of spanning trees in some classes of graphs. This is made possibl...
In this thesis we study the number of spanning trees in some classes of graphs. This is made possibl...
This paper is devoted to computational problems related to Markov chains (MC) on a finite state spac...
Let fm,n,h be the number of spanning forests with h edges in the complete bipartite graph Km,n. Kirc...
Analysis of AlgorithmsLet fm,n,h be the number of spanning forests with h edges in the complete bipa...
Kirchhoff's Matrix Tree Theorem permits the calculation of the number of spanning trees in any given...
Abstract. We prove ‘twisted ’ versions of Kirchhoff’s network theorem and Kirchhoff’s matrix-tree th...
The Laplacian matrix of a graph $G$ is $L(G)=D(G)-A(G)$, where $A(G)$ is the adjacency matrix and $D...
Given a weighted and finite graph, an efficient way to sample spanning treesis due to Wilson, who in...
International audienceIf G is a strongly connected finite directed graph, the set T G of rooted dire...
We consider generalizations of Schuetzenberger's promotion operator on the set L of linear extension...
We consider generalizations of Schuetzenberger's promotion operator on the set L of linear extension...
International audienceIf G is a strongly connected finite directed graph, the set T G of rooted dire...
Kirchhoff's Matrix Tree Theorem permits the calculation of the number of spanning trees in any given...
AbstractOne of the classical results in graph theory is the matrix-tree theorem which asserts that t...
In this thesis we study the number of spanning trees in some classes of graphs. This is made possibl...
In this thesis we study the number of spanning trees in some classes of graphs. This is made possibl...
This paper is devoted to computational problems related to Markov chains (MC) on a finite state spac...
Let fm,n,h be the number of spanning forests with h edges in the complete bipartite graph Km,n. Kirc...
Analysis of AlgorithmsLet fm,n,h be the number of spanning forests with h edges in the complete bipa...
Kirchhoff's Matrix Tree Theorem permits the calculation of the number of spanning trees in any given...
Abstract. We prove ‘twisted ’ versions of Kirchhoff’s network theorem and Kirchhoff’s matrix-tree th...
The Laplacian matrix of a graph $G$ is $L(G)=D(G)-A(G)$, where $A(G)$ is the adjacency matrix and $D...
Given a weighted and finite graph, an efficient way to sample spanning treesis due to Wilson, who in...
International audienceIf G is a strongly connected finite directed graph, the set T G of rooted dire...
We consider generalizations of Schuetzenberger's promotion operator on the set L of linear extension...
We consider generalizations of Schuetzenberger's promotion operator on the set L of linear extension...
International audienceIf G is a strongly connected finite directed graph, the set T G of rooted dire...