Article ID Journal Published Year Pages File Type
4667145 Advances in Mathematics 2010 14 Pages PDF
Abstract

If R, S, T are irreducible SL3(C)-representations, we give an easy and explicit description of a basis of the space of equivariant maps R⊗S→T (Theorem 3.1). We apply this method to the rationality problem for invariant function fields. In particular, we prove the rationality of the moduli space of plane curves of degree 34. This uses a criterion which ensures the stable rationality of some quotients of Grassmannians by an SL-action (Proposition 5.4).

Related Topics
Physical Sciences and Engineering Mathematics Mathematics (General)