Subalgebra depth and double crossed products

Abstract

In this paper we explore the concept of depth of a ring extension when the overall algebra factorises as a product of two subalgebras, in particular the case of finite dimensional Hopf algebras. As a result we generalise the results by Kadison and Young HKY on depth of a Hopf algebra H in its smash product with a finite dimensional left H-module algebra A, A#H to the context of generalised smash products Q*op# H Bz1 where Q is the quotient module coalgebra associated to the extension R⊂eq H of finite dimensional Hopf algebras Ka2HKYH. Moreover, following the construction of double crossed products in Ma and Ma1 we use our result on factorisation algebras to get a general result on the depth of the extension of a Hopf algebra H in its Drinfel d double D(H). Keywords : Depth, Factorisation Algebra, Smash Product, Drinfel d Double, Double Crossed Product, Normal Extension. Subject classification: 20C05, 20G05, 16W30, 17B37, 13E10.