On certain submodules of Weyl modules for SO(2n+1,F) with char(F) = 2

Abstract

For k = 1, 2,...,n-1 let Vk = V(λk) be the Weyl module for the special orthogonal group G = SO(2n+1,) with respect to the k-th fundamental dominant weight λk of the root system of type Bn and put Vn = V(2λn). It is well known that all of these modules are irreducible when char() ≠ 2 while when char() = 2 they admit many proper submodules. In this paper, assuming that char() = 2, we prove that Vk admits a chain of submodules Vk = Mk ⊃ Mk-1⊃ ... ⊃ M1⊃ M0 ⊃ M-1 = 0 where Mi Vi for 1,..., k-1 and M0 is the trivial 1-dimensional module. We also show that for i = 1, 2,..., k the quotient Mi/Mi-2 is isomorphic to the so called i-th Grassmann module for G. Resting on this fact we can give a geometric description of Mi-1/Mi-2 as a submodule of the i-th Grassmann module. When is perfect G Sp(2n,) and Mi/Mi-1 is isomorphic to the Weyl module for Sp(2n,) relative to the i-th fundamental dominant weight of the root system of type Cn. All irreducible sections of the latter modules are known. Thus, when is perfect, all irreducible sections of Vk are known as well.