On index expectation curvature for manifolds

Abstract

Index expectation curvature K(x) = E[if(x)] on a compact Riemannian 2d-manifold M is the expectation of Poincare-Hopf indices if(x) and so satisfies the Gauss-Bonnet relation that the interval of K over M is Euler characteristic X(M). Unlike the Gauss-Bonnet-Chern integrand, such curvatures are in general non-local. We show that for small 2d-manifolds M with boundary embedded in a parallelizable 2d-manifold N of definite sectional curvature sign e, an index expectation K(x) with definite sign ed exists. The function K(x) is constructed as a product of sectional index expectation curvature averages Kk(x) = E[ik(x)] of a probability space of Morse functions f for which if(x) is the product of ik(x), where the ik are independent and so uncorrelated.