On a theorem of Lehrer and Zhang

Abstract

Let K be an arbitrary field of characteristic not equal to 2. Let m, n∈ and V an m dimensional orthogonal space over K. There is a right action of the Brauer algebra n(m) on the n-tensor space V n which centralizes the left action of the orthogonal group O(V). Recently G.I. Lehrer and R.B. Zhang defined certain quasi-idempotents Ei in n(m) (see (keydfn)) and proved that the annihilator of V n in n(m) is always equal to the two-sided ideal generated by E[(m+1)/2] if K=0 or K>2(m+1). In this paper we extend this theorem to arbitrary field K with K≠ 2 as conjectured by Lehrer and Zhang. As a byproduct, we discover a combinatorial identity which relates to the dimensions of Specht modules over symmetric groups of different sizes and a new integral basis for the annihilator of V m+1 in m+1(m).