Orders of Nikshych's Hopf algebra

Abstract

Let p be an odd prime number and K a number field having a primitive p-th root of unity ζ. We prove that Nikshych's non-group theoretical Hopf algebra Hp, which is defined over Q(ζ), admits a Hopf order over the ring of integers OK if and only if there is an ideal I of OK such that I2(p-1) = (p). This condition does not hold in a cyclotomic field. Hence this gives an example of a semisimple Hopf algebra over a number field not admitting a Hopf order over any cyclotomic ring of integers. Moreover, we show that, when a Hopf order over OK exists, it is unique and we describe it explicitly.