Braided symmetric algebras and a first fundamental theorem of invariant theory for Uq(G2)

Abstract

We develop invariant theory for the quantum group Uq of G2 at generic q in the setting of braided symmetric algebras. Let Am be the braided symmetric algebra over m-copies of the 7-dimensional simple Uq-module. A set of Uq-invariants in Am attached to certain acyclic trivalent graphs is obtained, which spans the subalgebra Am Uq of invariants as vector space. A finite set of homogeneous elements is constructed explicitly, which generates Am Uq as algebra. Commutation relations among the algebraic generators are determined. These results may be regarded as a non-commutative first fundamental theorem of invariant theory for Uq. The algebra Am is a non-flat quantisation of the coordinate ring of C7 Cm. As Uq-module, Am= A1 m and we decompose A1 into simple submodules. The affine scheme associated to the classical limit of Am is described. This is a rare case where the structure of a non-flat quantisation is understood.