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Representations and actions of finite dimensional Hopf algebras

$159,612FY2010MPSNSF

University Of Southern California, Los Angeles CA

Investigators

Abstract

The main part of this project concerns representations of a semisimple Hopf algebra, particularly the Frobenius-Schur indicators of its representations. The values of the indicators should give information not only about the representation category of a Hopf algebra, but also about the structure of the Hopf algebra itself. A related useful invariant is the trace of the antipode of a Hopf algebra. The project also concerns actions of Hopf algebras on non-commutative algebras, especially when the Jacobson or prime radical is stable under such an action. A basic problem is the relationship of the spectrum of primitive ideals to its stable analog, and to the primitive ideals of a Hopf semidirect product. Progress here would help in doing "invariant theory" for Hopf algebras. Hopf algebras are special algebraic objects which arose in topology and algebraic groups in the 1940's and 1950's. More recently they have appeared in other parts of mathematics, such as geometry (knot theory), and in mathematical physics (conformal field theory). Frequently Hopf algebras give invariants of these structures. Thus a greater understanding of Hopf algebras themselves may eventually be useful in these areas. This project will involve several women students as part of the Women in Science and Engineering (WiSE) program at USC.

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