Gauss decomposition of connection matrices and application to Yang-Baxter equation. I (Q1318922)

Let \(G(x) = (g_{ij})^ N_{i,j=1}\), \(x = (x_ 1,x_ 2, \dots, x_ m)\), be a matrix such that the entries \(g_{ij}\) are functions of \(x \in \mathbb{C}^ m\). It is supposed that \(G(x)\) is connected in a certain manner with the one cocycle \(W_ \tau (x)\) with values in \(GL_ N (\mathbb{C})\) which satisfies certain conditions. This conditions show that \(W_ \tau\) satisfies the Yang-Baxter equation. The corresponding matrix \(G(x)\) is called admissible. Admissible matrices appear in a natural manner as connection coefficients among the symmetric \(A\)-type Jackson integrals. In this paper the author states (without proof) explicit formulas for them.