Completely Splittable Representations of Symmetric Groups

Let X be a finite set and let d be a function from X = X into an arbitrary group G G. An example of such a function arises by taking a tree T whose vertices Ž include X, assigning two elements of G G to each edge of T one for each . Ž . orientation of the edge , and setting d i, j equal to the produ

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

This paper is the first in a series of three papers on the Young symmetrizers for the spin representations of the symmetric group. In this opening paper, it is shown that the projective analogue of the Young symmetrizer recently introduced by Nazarov has a structure resembling the p λ q λ -form exhi