The coalgebra extension problem for Z/p

Abstract

For a coalgebra Ck over field k, we define the "coalgebra extension problem" as the question: what multiplication laws can we define on Ck to make it a bialgebra over k? This paper answers this existence-uniqueness question for certain coalgebras called "circulant coalgebras". We begin with the trigonometric coalgebra, comparing and contrasting with the group-(bi)algebra k[ Z/2]. This leads to a generalization, the dual coalgebra to the group-algebra k[ Z/p], which we then investigate. We show connections with other questions, motivating us to answer to the coalgebra extension problem for these families. The answer depends interestingly on the base field k's characteristic. Along similar lines, we investigate the algebraic group S1 over arbitrary k. We find that similar complications arise in characteristic 2. We explore this, motivated (by quantum groups) by the question of whether or not O(S1) is pointed. We give a very explicit conjecture in terms of the Chebyshev polynomials of trigonometry. We end by constructing a formal group object, in a certain monoidal category of modules of k[[h]], as a 2nd order deformation of k[t].