Classification of $D$-bialgebra structures on power series algebras

Abstract: In this paper, we use algebro-geometric methods in order to derive classification results for so-called $D$-bialgebra structures on the power series algebra $A[![z]!]$ for certain central simple non-associative algebras $A$. These structures are closely related to a version of the classical Yang-Baxter equation (CYBE) over $A$. If $A$ is a Lie algebra, we obtain new proofs for pivotal steps in the known classification of non-degenerate topological Lie bialgebra structures on $A[![z]!]$ as well as of non-degenerate solutions of the usual CYBE. If $A$ is associative, we achieve the classification of non-triangular topological balanced infinitesimal bialgebra structures on $A[![z]!]$ as well as of all non-degenerate solutions of an associative version of the CYBE.