The Kernel of the A-Genus in Rational Spin Bordism is Generated by Ricci-Positive Manifolds

Abstract

We prove that, in every degree, the rational Spin bordism classes represented by manifolds admitting metrics with positive Ricci curvature span exactly the kernel of the A-genus. More precisely, for \[ R=Ω*Spin, J=( A:R[u]),\] the Q-span of bordism classes of Ricci-positive Spin manifolds equals J in each degree. This answers, in the differentiable rational Spin category, a question about rational bordism obstructions to positive Ricci curvature which was raised in the context of complex elliptic genera. The proof uses smooth complete intersections of an odd number of quadrics \[ Ym,⊂ CP2m+, =1,\, 3,\, …,\, 2m-1. \] These manifolds have real dimension 4m, are Spin and Fano, and therefore admit metrics with positive Ricci curvature. A first-order thickening of the A-genus induces m-1 linear functionals on (J/J2)4m. Their values on the classes [Ym,] are governed by polynomials Pm,q() of strictly increasing degrees q+1=1, 2, …, m-1. This gives full rank by a polynomial-interpolation argument.