Add to ORKGA cyclic graph is a graph with at each vertex a cyclic order of the edges incident with it specied. We characterize which real-valued functions on the collection of cubic cyclic graphs are partition functions of a real vertex model (P. de la Harpe, V.F.R. Jones, Graph invariants related to statistical mechanical models: examples and problems, Journal of Combinatorial Theory, Series B 57 (1993) 207{227). They are characterized by `weak re ection positivity', which amounts to the positive semideniteness of matrices based on the `k-join' of cubic cyclic graphs (for all k 2 Z+). Basic tools are the representation theory of the symmetric group and geometric invariant theory, in particular the Hanlon-Wales theorem on the decomposition of ...
AbstractWe characterize which graph parameters are partition functions of a vertex model over an alg...
This thesis is concerned with links between certain graph parameters and the invariant theory of the...
Partition functions arise in combinatorics and related problems of statistical physics as they encod...
A {\em cyclic graph} is a graph with at each vertex a cyclic order of the edges incident with it spe...
We characterize which graph parameters are partition functions of a vertex model over an algebraica...
We characterize which graph invariants are partition functions of a vertex model over C, in terms o...
In this paper we introduce, and characterize, a class of graph parameters obtained from tensor invar...
We characterize which graph invariants are partition functions of a spin model over C, in terms of t...
Abstract. For which values of k does a uniformly chosen 3-regular graph G on n vertices typically co...
We study rank functions (also known as graph homomorphisms onto Z), ways of imposing graded poset st...
In recent joint work of the authors with Laca, we precisely formulated the notion of partition funct...
A family F of triplets of a set X is a cyclic order if the following axioms are satisfied: (a, b, c)...
In this thesis we expand upon a line of research pioneered by Freedman, Lovász and Schrijver, and Sz...
A graph is a cycle of cliques, if its set of vertices can be partitioned into clusters, such that ea...
AbstractThis paper is a proof of the following theorem: ωω→(ωω, 3)2 Here ωω denotes the ordinal expo...
AbstractWe characterize which graph parameters are partition functions of a vertex model over an alg...
This thesis is concerned with links between certain graph parameters and the invariant theory of the...
Partition functions arise in combinatorics and related problems of statistical physics as they encod...
A {\em cyclic graph} is a graph with at each vertex a cyclic order of the edges incident with it spe...
We characterize which graph parameters are partition functions of a vertex model over an algebraica...
We characterize which graph invariants are partition functions of a vertex model over C, in terms o...
In this paper we introduce, and characterize, a class of graph parameters obtained from tensor invar...
We characterize which graph invariants are partition functions of a spin model over C, in terms of t...
Abstract. For which values of k does a uniformly chosen 3-regular graph G on n vertices typically co...
We study rank functions (also known as graph homomorphisms onto Z), ways of imposing graded poset st...
In recent joint work of the authors with Laca, we precisely formulated the notion of partition funct...
A family F of triplets of a set X is a cyclic order if the following axioms are satisfied: (a, b, c)...
In this thesis we expand upon a line of research pioneered by Freedman, Lovász and Schrijver, and Sz...
A graph is a cycle of cliques, if its set of vertices can be partitioned into clusters, such that ea...
AbstractThis paper is a proof of the following theorem: ωω→(ωω, 3)2 Here ωω denotes the ordinal expo...
AbstractWe characterize which graph parameters are partition functions of a vertex model over an alg...
This thesis is concerned with links between certain graph parameters and the invariant theory of the...
Partition functions arise in combinatorics and related problems of statistical physics as they encod...