The inequalities of Chern classes and Riemann-Roch type inequalities

Abstract

Motivated by Koll\'ar-Matsusaka's Riemann-Roch type inequalities, applying effective very ampleness of adjoint bundles on Fujita conjecture and log-concavity given by Khovanskii-Teissier inequalities, we show that for any partition λ of the positive integer d there exists a universal bivariate polynomial Qλ(x, y) which has deg Q ≤ d and whose coefficients depend only on n, such that for any projective manifold X of dimension n and any ample line bundle L on X, equation* |cλ(X)· Ln -d|≤ Qλ(Ln, KX · Ln -1 )(Ln)d-1, equation* where KX is the canonical bundle of X and cλ(X) is the monomial Chern class given by the partition λ. As a special case, when KX or -KX is ample, this implies that there exists a constant cn depending only on n such that for any monomial Chern classes of top degree, the Chern number ratios equation* |cλ(X)c1 (X) n|≤ cn, equation* which recovers a recent result of Du-Sun. The main result also yields an asymptotic version of the sharper Riemann-Roch type inequality. Furthermore, using similar method we also obtain inequalities for Chern classes of the logarithmic tangent bundle.