On the Fundumental Invariant of the Hecke Algebra Hn(q)
Abstract
The fundumental invariant of the Hecke algebra Hn(q) is the q-deformed class-sum of transpositions of the symmetric group Sn. Irreducible representations of Hn(q), for generic q, are shown to be completely characterized by the corresponding eigenvalues of Cn alone. For Sn more and more invariants are necessary as n inereases. It is pointed out that the q-deformed classical quadratic Casimir of SU(N) plays an analogous role. It is indicated why and how this should be a general phenomenon associated with q-deformation of classical algebras. Apart from this remarkable conceptual aspect Cn can provide powerful and elegant techniques for computations. This is illustrated by using the sequence C2, C3, ·s,\; Cn to compute the characters of Hn(q).
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