Los puntos clave no están disponibles para este artículo en este momento.
In this manuscript we consider a special complex torus, denoted S_₂₊ (for each k N, \, k 1) and called the Dirac spinor torus. It is an Abelian variety of complex dimension 2^k whose covering space is the space of Dirac spinors, ₂₊, for the Clifford algebra Cl (C^2k) associated with the vector space C^2k. Fixing an isomorphism: Cl (C^2k) End (₂₊), we define Clifford multiplication on S_₂₊ 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_₂₊ is a subset.
Brown et al. (Sat,) studied this question.