Higher order analogues of unitarity condition for quantum R-matrices

Abstract

We prove a family of n-th order identities for quantum R-matrices of Baxter-Belavin type in fundamental representation. The set of identities includes the unitarity condition as the simplest one (n=2). Our study is inspired by the fact that the third order identity provides commutativity of the Knizhnik-Zamolodchikov-Bernard connections. On the other hand the same identity gives rise to R-matrix valued Lax pairs for the classical integrable systems of Calogero type. The latter construction uses interpretation of quantum R-matrix as matrix generalization of the Kronecker function. We present a proof of the higher order scalar identities for the Kronecker functions which is then naturally generalized to the R-matrix identities.