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LIFTINGS OF GRADED QUASIHOPF ALGEBRAS WITH RADICAL OF PRIME CODIMENSION
, 2004
"... Let p be a prime, and let RG(p) denote the set of equivalence classes of radically graded finite dimensional quasiHopf algebras over C, whose radical has codimension p. In [EG1],[EG2] we completely describe the set RG(p). Namely, we show that for p> 2, RG(p) consists of the quasiHopf algebras A(q) ..."
Abstract

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Let p be a prime, and let RG(p) denote the set of equivalence classes of radically graded finite dimensional quasiHopf algebras over C, whose radical has codimension p. In [EG1],[EG2] we completely describe the set RG(p). Namely, we show that for p> 2, RG(p) consists of the quasiHopf algebras A(q) constructed in [G]