Connections between the Representations of the Symmetric Group and the Symplectic Group in Characteristic 2

Let G be a finite symplectic or unitary group. We characterize the Weil representations of G via their restriction to a standard subgroup. Then we complete the determination of complex representations of G with specific minimal polynomials of certain elements by showing that they coincide with the W

S where S = /p n \* T is of symplectic type with T an extraspecial p-group and O p G solvable. From results in [3] it is easy to show that when p is odd, the Quillen complex of G at p is Cohen-Macaulay. In this note we show that the result also holds when p = 2.

We show that if P is a Sylow 2-subgroup of the finite symplectic group m Ž . ## Sp q , where q is a power of 2, then P has irreducible complex characters of 2 m m yt mŽ my1.r2 w x degree 2 q , where t is any integer satisfying 0 F t F mr2 , and that q mŽ my1.r2 is the largest possible degree of a

Characters of irreducible representations irreps of the symmetric group corresponding to the two-row Young diagrams, i.e., describing transformation properties of N-electron eigenfunctions of the total spin operators, have been expressed as explicit functions of the number of electrons N and of the

The representation matrices generated by the projected spin functions have some very interesting properties. All the matrix elements are integers and they are quite sparse. A very efficient algorithm is presented for the calculation of these representation matrices based on a graphical approach and