Invariants of the special orthogonal group and an enhanced Brauer category

Abstract

We first give a short intrinsic, diagrammatic proof of the First Fundamental Theorem of invariant theory (FFT) for the special orthogonal group SOm(C), given the FFT for Om(C). We then define, by means of a presentation with generators and relations, an enhanced Brauer category B(m) by adding a single generator to the usual Brauer category B(m), together with four relations. We prove that our category B(m) is actually (and remarkably) equivalent to the category of representations of SOm generated by the natural representation. The FFT for SOm amounts to the surjectivity of a certain functor F on Hom spaces, while the Second Fundamental Theorem for SOm says simply that F is injective on Hom spaces. This theorem provides a diagrammatic means of computing the dimensions of spaces of homomorphisms between tensor modules for SOm (for any m). These methods will be applied to the case of the orthosymplectic Lie algebras osp(m|2n), where the super-Pfaffian enters, in a future work.