Integral theory for Hopf (co)quasigroups

Abstract

We recall the notion of a Hopf (co)quasigroup defined in Kl09 and define integration and Fourier Transforms on these objects analogous to those in the theory of Hopf algebras. Using the general Hopf module theory for Hopf (co)quasigroups from Br09 we show that a finite dimensional Hopf (co)quasigroup has a unique integration up to scale and an invertible antipode. We also supply the inverse Fourier transformation and show that it maps the convolution product on H to the product in its dual H*. Finally, we further develop the theory to consider Frobenius Hopf (co)quasigroups, separability and semisimplicity.