The second fundamental theorem of invariant theory for the orthogonal group

Abstract

Let V=n be endowed with an orthogonal form and G=(V) be the corresponding orthogonal group. Brauer showed in 1937 that there is a surjective homomorphism :Br(n)G(V r), where Br(n) is the r-string Brauer algebra with parameter n. However the kernel of has remained elusive. In this paper we show that, in analogy with the case of (V), for r≥ n+1, has kernel which is generated by a single idempotent element E, and we give a simple explicit formula for E. Using the theory of cellular algebras, we show how E may be used to determine the multiplicities of the irreducible representations of (V) in V r. We also show how our results extend to the case where is replaced by an appropriate field of positive characteristic, and comment on quantum analogues of our results.