Smoothness of commutative Hopf algebras
Abstract
Hopf algebras, most generally in a semisimple abelian symmetric monoidal category, are here supposed to be commutative but not to be of finite-type, and their (equivariant) smoothness are discussed. Given a Hopf algebra H in a category such as above, it is proved that the following are equivalent: (i) H is smooth as an algebra; (ii) H is smooth as an H-comodule algebra; (iii) the product morphism SH2(H+) H+ defined on the 2nd symmetric power is monic. Working over a field k of characteristic zero, we prove: (1) every ordinary Hopf algebra, i.e., such in the category Vec of vector spaces, satisfies the equivalent conditions (i)--(iii) and some others; (2) every Hopf algebra in the category sVec of super-vector spaces has a certain property that is stronger than (i). In the case where chark=p>0, there are shown weaker properties of ordinary Hopf algebras and of Hopf algebras in sVec or in the ind-completion Verpind of the Verlinde category.
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