Group theoretic properties of Clifford multiplication on 2-torsion points on the Dirac Spinor Abelian Variety

Abstract

In this manuscript we consider a special complex torus, denoted S_2k (for each k ∈ N,\, k ≥ 1) and called the Dirac spinor torus. It is an Abelian variety of complex dimension 2k whose covering space is the space of Dirac spinors, 2k, for the Clifford algebra Cl(C2k) associated with the vector space C2k. Fixing an isomorphism :Cl(C2k)→ End (2k), we define Clifford multiplication on S_2k as the actions of those endomorphisms in the image of that preserve the full rank lattice. We analyze the properties of that Clifford multiplication on the 2-torsion points of the Dirac spinor torus. We identify the Clifford actions with permutation maps that represent all isomorphism classes of these actions on the group of 2-torsion points. We provide a structure theorem describing these isomorphism classes of Clifford actions in a way that is independent of the choice of representatives. We conclude by extending the scope of our analysis to the group of n-torsion points and analyzing the fixed points and translation constants of entry-permuting maps, a broader class of actions of which the Clifford actions on the 2-torsion points of S_2k is a subset.