On traces of tensor representations of diagrams

Abstract

Let T be a set, of types, and let ,o:T+. A T-diagram is a locally ordered directed graph G equipped with a function τ:V(G) T such that each vertex v of G has indegree (τ(v)) and outdegree o(τ(v)). (A directed graph is locally ordered if at each vertex v, linear orders of the edges entering v and of the edges leaving v are specified.) Let V be a finite-dimensional -linear space, where is an algebraically closed field of characteristic 0. A function R on T assigning to each t∈ T a tensor R(t)∈ V* (t) V o(t) is called a tensor representation of T. The trace (or partition function) of R is the -valued function pR on the collection of T-diagrams obtained by `decorating' each vertex v of a T-diagram G with the tensor R(τ(v)), and contracting tensors along each edge of G, while respecting the order of the edges entering v and leaving v. In this way we obtain a tensor network. We characterize which functions on T-diagrams are traces, and show that each trace comes from a unique `strongly nondegenerate' tensor representation. The theorem applies to virtual knot diagrams, chord diagrams, and group representations.