Syzygies of A Tower of Compact Local Hermitian Symmetric Spaces of Finite Type

Abstract

Let X be a n dimensional compact local Hermitian symmetric space of non-compact type and L=(KX)(qM) be an adjoint line bundle. Let c>0 be a constant. Assume the curvature of M is cω, where ω is the k\"ahler form of X, and X's injectivity radius has a lower bound τ>2e, where e is the Euler number. In this article, we prove that if q>2ecτ · (p+1)n, then L enjoys Property Np. Applying this result to a tower of compact local Hermitian symmetric spaces ·s Xs+1 Xs·s X0=X, we prove that 2Ks has Properties Np for s 0 and fixed p. Based on the same technique, we show a criterion of projective normality of algebraic curves and a division theorem with small power difference.