On the saturation conjecture for Spin(2n)

Abstract

In this paper we examine the saturation conjecture on decompositions of tensor products of irreducible representations for complex semisimple algebraic groups of type D (the even spin groups: Spin(2n) for n 4 an integer), extending work done by Kumar-Kapovich-Millson on Spin(8). Our main theorem asserts that the saturation conjecture holds for Spin(10) and Spin(12): for all triples of dominants weights λ,μ, such that λ+μ+ is in the root lattice, and for any N>0, (V(λ) V(μ) V())G 0 if and only if (V(Nλ) V(Nμ) V(N))G 0, for G= Spin(10) or Spin(12). Some related results for groups of other types are listed as well.