Dirac operator on spinors and diffeomorphisms
arXiv:1209.2021 · doi:10.1088/0264-9381/30/1/015006
Abstract
The issue of general covariance of spinors and related objects is reconsidered. Given an oriented manifold $M$, to each spin structure $Ï$ and Riemannian metric $g$ there is associated a space $S_{Ï, g}$ of spinor fields on $M$ and a Hilbert space $\HH_{Ï, g}= L^2(S_{Ï, g},\vol{M}{g})$ of $L^2$-spinors of $S_{Ï, g}$. The group $\diff{M}$ of orientation-preserving diffeomorphisms of $M$ acts both on $g$ (by pullback) and on $[Ï]$ (by a suitably defined pullback $f^*Ï$). Any $f\in \diff{M}$ lifts in exactly two ways to a unitary operator $U$ from $\HH_{Ï, g} $ to $\HH_{f^*Ï,f^*g}$. The canonically defined Dirac operator is shown to be equivariant with respect to the action of $U$, so in particular its spectrum is invariant under the diffeomorphisms.
13 pages