Cocommutative q-cycle coalgebra structures on the dual of the truncated polynomial algebra

Abstract

In order to construct solutions of the braid equation we consider bijective left non-degenerate set-theoretic type solutions, which correspond to regular q-cycle coalgebras. We obtain a partial classification of the different q-cycle coalgebra structures on the dual coalgebra of K[y]/ yn, the truncated polynomial algebra. We obtain an interesting family of involutive q-cycle coalgebras which we call Standard Cycle Coalgebras. They are parameterized by free parameters \p1,...,pn-1\ and in order to verify that they are compatible with the braid equation, we have to verify that certain differential operators ∂j on formal power series in two variables K[[x, y]] satisfy the condition (∂j G)i = (∂i G)j for all i, j, where G is a formal power series associated to the given q-cycle coalgebra. It would be interesting to find out the relation of these operators with the operators given by Yang in the context with 2-dimensional quantum field theories, which was one of the origins of the Yang-Baxter equation.