The Grothendieck algebras of certain smash product semisimple Hopf algebras

Abstract

Let H be a semisimple Hopf algebra over an algebraically closed field k of characteristic p>k(H)1/2 and p 2k(H). In this paper, we consider the smash product semisimple Hopf algebra H\#kG, where G is a cyclic group of order n:=2k(H). Using irreducible representations of H and those of kG, we determine all non-isomorphic irreducible representations of H\#kG. There is a close relationship between the Grothendieck algebra (G0(H\#kG)Zk,*) of H\#kG and the Grothendieck algebra (G0(H)Zk,*) of H. To establish this connection, we endow with a new multiplication operator on G0(H)Zk and show that the Grothendieck algebra (G0(H\#kG)Zk,) is isomorphic to the direct sum of (G0(H)Zk,*)n2 and (G0(H)Zk,)n2.