Positivity of Riemann-Roch polynomials and Todd classes of hyperk\"ahler manifolds

Abstract

For a hyperk\"ahler manifold X of dimension 2n, Huybrechts showed that there are constants a0, a2, …, a2n such that (L) =Σi=0na2i(2i)!qX(c1(L))i for any line bundle L on X, where qX is the Beauville-Bogomolov-Fujiki quadratic form of X. Here the polynomial Σi=0na2i(2i)!qi is called the Riemann-Roch polynomial of X. In this paper, we show that all coefficients of the Riemann-Roch polynomial of X are positive. This confirms a conjecture proposed by Cao and the author, which implies Kawamata's effective non-vanishing conjecture for projective hyperk\"ahler manifolds. It also confirms a question of Riess on strict monotonicity of Riemann-Roch polynomials. In order to estimate the coefficients of the Riemann-Roch polynomial, we produce a Lefschetz-type decomposition of td1/2(X), the root of the Todd genus of X, via the Rozansky-Witten theory following the ideas of Hitchin, Sawon, and Nieper-Wikirchen.