Notes on gamma invariants of finite dimensional Hopf algebras

Abstract

Let H be a finite-dimensional, non-semisimple Hopf algebra over an algebraically closed field k. This paper investigates the asymptotic behavior of the core of left H-modules through the lens of the gamma invariant γX relative to a representation ideal IX. We establish an equivalent characterization for the quotient of the Green ring RX to be a transitive fusion ring, demonstrating that transitivity is synonymous with the non-degeneracy of a naturally induced bilinear form and the collapse of the ideals P+, P- and Imax into a single ideal. Furthermore, we prove that the Green ring exhibits the structure of a representation ring in the sense of Benson, provided that the square of the antipode is an inner automorphism and the equality Imax=Iproj holds. As an explicit application of these frameworks, we analyze the Drinfeld double D(H4) of the Sweedler algebra, identifying an infinite family of distinct representation ideals and proving that the maximal gamma invariant γmax induces a genuine ring homomorphism. Finally, for Hopf algebras of finite representation type under the assumption P+ = P- = Imax, we show that γmax coincides precisely with the Frobenius--Perron dimension, and we explicitly compute the gamma invariants for the standard basis elements of the Green ring of the Taft algebra Hn(q).