Add to ORKGThe U-polynomial, the polychromate and the symmetric function generalization of the Tutte polynomial due to Stanley are known to be equivalent in the sense that the coefficients of any one of them can be obtained as a function of the coefficients of any other. The definition of each of these functions suggests a natural way in which to strengthen them which also captures Tutte’s universal V-function as a specialization. We show that the equivalence remains true for the strong functions thus answering a question raised by Dominic Welsh. 1
AbstractWe introduce a new property of graphs called ‘q-state Potts uniqueness’ and relate it to chr...
This paper initiates a study of the connection between graph homomorphisms and the Tutte polynomial....
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1995.Includes bibliogr...
The U-polynomial, the polychromate and the symmetric function generalization of the Tutte polynomial...
The U-polynomial, the polychromate and the symmetric function generalization of the Tutte polynomial...
This chapter covers the U-, W-, V- and strong U-polynomials, generalizations of the Tutte polynomial...
Motivated by certain conjectures regarding immanants of Jacobi-Trudi matrices, Stanley has recently ...
This chapter covers the U-, W-, V- and strong U-polynomials, generalizations of the Tutte polynomial...
AbstractThe V-functions of Tutte [1] are generalized to U-functions on graphs with a distinguished s...
AbstractFor a finite graph G with d vertices we define a homogeneous symmetric function XG of degree...
The final publication is available at Elsevier via https://doi.org/10.1016/j.jcta.2021.105572 © 2022...
AbstractThis paper is a sequel to an earlier paper dealing with a symmetric function generalization ...
The Tutte polynomial is an important tool in graph theory. This paper provides an introduction to th...
AbstractWe consider generalizations of the Tutte polynomial on multigraphs obtained by keeping the m...
. Stanley has studied a symmetric function generalization XG of the chromatic polynomial of a graph ...
AbstractWe introduce a new property of graphs called ‘q-state Potts uniqueness’ and relate it to chr...
This paper initiates a study of the connection between graph homomorphisms and the Tutte polynomial....
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1995.Includes bibliogr...
The U-polynomial, the polychromate and the symmetric function generalization of the Tutte polynomial...
The U-polynomial, the polychromate and the symmetric function generalization of the Tutte polynomial...
This chapter covers the U-, W-, V- and strong U-polynomials, generalizations of the Tutte polynomial...
Motivated by certain conjectures regarding immanants of Jacobi-Trudi matrices, Stanley has recently ...
This chapter covers the U-, W-, V- and strong U-polynomials, generalizations of the Tutte polynomial...
AbstractThe V-functions of Tutte [1] are generalized to U-functions on graphs with a distinguished s...
AbstractFor a finite graph G with d vertices we define a homogeneous symmetric function XG of degree...
The final publication is available at Elsevier via https://doi.org/10.1016/j.jcta.2021.105572 © 2022...
AbstractThis paper is a sequel to an earlier paper dealing with a symmetric function generalization ...
The Tutte polynomial is an important tool in graph theory. This paper provides an introduction to th...
AbstractWe consider generalizations of the Tutte polynomial on multigraphs obtained by keeping the m...
. Stanley has studied a symmetric function generalization XG of the chromatic polynomial of a graph ...
AbstractWe introduce a new property of graphs called ‘q-state Potts uniqueness’ and relate it to chr...
This paper initiates a study of the connection between graph homomorphisms and the Tutte polynomial....
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1995.Includes bibliogr...