Second-Jet Equivariant η Separations on Lens Spaces

Abstract

Lens spaces are useful test examples in spectral geometry because their spin Dirac eigenspaces admit explicit congruence descriptions. We use these descriptions to study equivariant η invariants for three-dimensional lens spaces with the round metric and the standard coordinate-torus action, retaining the spin-Fourier character of each eigenspace rather than only the ordinary scalar η value. For the square family L(2,-1) and L(2,2-1), with ≥ 5 odd, we obtain a residual-circle equivariant η separation: the ordinary η values agree, and the first derivative of the residual η germ vanishes by symmetry, but the second derivative is nonzero. For L(25,4) versus L(25,9), the normalized second derivative is -6080. Thus, the residual-circle equivariant η germ detects a distinction invisible to the ordinary η invariant. The calculation uses spin-Fourier residues directly; perturbative Hessian signs serve only as motivation and are not part of the invariant.