Multiplicative Bases for the Centres of the Group Algebra and Iwahori-Hecke Algebra of the Symmetric Group
Abstract
Let n be the Iwahori-Hecke algebra of the symmetric group Sn, and let Z(n) denote its centre. Let B=b1,b2,...,bt be a basis for Z(n) over R=[q,q-1]. Then B is called multiplicative if, for every i and j, there exists k such that bibj= bk. In this article we prove that there are no multiplicative bases for Z( Sn) and Z(n) when n 3. In addition, we prove that there exist exactly two multiplicative bases for Z( S2) and none for Z(2).
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