The Projective Class Rings of a family of pointed Hopf algebras of Rank two

Abstract

In this paper, we compute the projective class rings of the tensor product Hn(q)=An(q) An(q-1) of Taft algebras An(q) and An(q-1), and its cocycle deformations Hn(0,q) and Hn(1,q), where n>2 is a positive integer and q is a primitive n-th root of unity. It is shown that the projective class rings rp(Hn(q)), rp(Hn(0,q)) and rp(Hn(1,q)) are commutative rings generated by three elements, three elements and two elements subject to some relations, respectively. It turns out that even Hn(q), Hn(0,q) and Hn(1,q) are cocycle twist-equivalent to each other, they are of different representation types: wild, wild and tame, respectively.