AbstractWe develop a Tutte decomposition theory for matrices and their combinatorial abstractions, bimatroids. As in the graph or matroid case, this theory is based on a deletion–contraction decomposition. The contribution from the deletion, derived by an inclusion–exclusion argument, consists of three terms. With one more term contributed from the contraction, the decomposition has four terms in general. There are universal decomposition invariants, one of them being a corank–nullity polynomial. Under a simple change of variables, the corank–nullity polynomial equals a weighted characteristic polynomial. This gives an analog of an identity of Tutte. Applications to counting and critical problems on matrices and graphs are given
AMS Subject Classication: 05B35, 05C10 Abstract. Using matroid duality and the critical problem, we ...
AbstractIn [W. Kook, V. Reiner, D. Stanton, A convolution formula for the Tutte polynomial, J. Combi...
AbstractWe give a general convolution–multiplication identity for the multivariate and bivariate ran...
AbstractWe develop a Tutte decomposition theory for matrices and their combinatorial abstractions, b...
The Tutte polynomial of a graph or a matroid, named after W. T. Tutte, has the important universal p...
Matroids are combinatorial objects that capture abstractly the essence of dependence. The Tutte poly...
The Tutte polynomial is the most general invariant of matroids and graphs that can be computed recur...
AbstractGiven a matroid M and its Tutte polynomial TM(x,y), TM(0,1) is an invariant of M with variou...
The multivariate Tutte polynomial (known to physicists as the Potts-model partition function) can be...
AbstractA simple decomposition for graphs yields generating functions for counting graphs by edges a...
Using matroid duality and the critical problem, we show that certain evaluations of the Tutte polyno...
The identity linking the Tutte polynomial with the Potts model on a graph implies the existence of a...
AbstractFor any matroidMrealizable over Q, we give a combinatorial interpretation of the Tutte polyn...
AbstractThis paper develops a theory of Tutte invariants for 2-polymatroids that parallels the corre...
AbstractWe discuss reducing the number of steps involved in computing the Tutte polynomial of a matr...
AMS Subject Classication: 05B35, 05C10 Abstract. Using matroid duality and the critical problem, we ...
AbstractIn [W. Kook, V. Reiner, D. Stanton, A convolution formula for the Tutte polynomial, J. Combi...
AbstractWe give a general convolution–multiplication identity for the multivariate and bivariate ran...
AbstractWe develop a Tutte decomposition theory for matrices and their combinatorial abstractions, b...
The Tutte polynomial of a graph or a matroid, named after W. T. Tutte, has the important universal p...
Matroids are combinatorial objects that capture abstractly the essence of dependence. The Tutte poly...
The Tutte polynomial is the most general invariant of matroids and graphs that can be computed recur...
AbstractGiven a matroid M and its Tutte polynomial TM(x,y), TM(0,1) is an invariant of M with variou...
The multivariate Tutte polynomial (known to physicists as the Potts-model partition function) can be...
AbstractA simple decomposition for graphs yields generating functions for counting graphs by edges a...
Using matroid duality and the critical problem, we show that certain evaluations of the Tutte polyno...
The identity linking the Tutte polynomial with the Potts model on a graph implies the existence of a...
AbstractFor any matroidMrealizable over Q, we give a combinatorial interpretation of the Tutte polyn...
AbstractThis paper develops a theory of Tutte invariants for 2-polymatroids that parallels the corre...
AbstractWe discuss reducing the number of steps involved in computing the Tutte polynomial of a matr...
AMS Subject Classication: 05B35, 05C10 Abstract. Using matroid duality and the critical problem, we ...
AbstractIn [W. Kook, V. Reiner, D. Stanton, A convolution formula for the Tutte polynomial, J. Combi...
AbstractWe give a general convolution–multiplication identity for the multivariate and bivariate ran...