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arxiv: 1210.3178 · v6 · pith:N4GHQTYYnew · submitted 2012-10-11 · 🧮 math.RT · math.GR

Hopf subalgebras and tensor powers of generalized permutation modules

classification 🧮 math.RT math.GR
keywords hopfdepthfinitemoduletensorpermutationpowerssubalgebra
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By means of a certain module V and its tensor powers in a finite tensor category, we study a question of whether the depth of a Hopf subalgebra R of a finite-dimensional Hopf algebra H is finite. The module V is the counit representation induced from R to H, which is then a generalized permutation module, as well as a module coalgebra. We show that if in the subalgebra pair either Hopf algebra has finite representation type, or V is either semisimple with R* pointed, projective, or its tensor powers satisfy a Burnside ring formula over a finite set of Hopf subalgebras including R, then the depth of R in H is finite. One assigns a nonnegative integer depth to V, or any other H-module, by comparing the truncated tensor algebras of V in a finite tensor category and so obtains an upper and lower bound for depth of a Hopf subalgebra. For example, a relative Hopf restricted module has depth 1, and a permutation module of a corefree subgroup has depth less than the number of values assumed by its character.

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