Uniformly bounded orthonormal sections of positive line bundles on complex manifolds

Abstract

We show the existence of uniformly bounded sequences of increasing numbers of orthonormal sections of powers Lk of a positive holomorphic line bundle L on a compact K\"ahler manifold M. In particular, we construct for each positive integer k, orthonormal sections sk1,…,sknk in H0(M,Lk), nkβ H0(M,Lk), such that \skj\ is a uniformly bounded family, where β is an explicit positive constant depending only on the dimension of M. For m=1, we can take β=.99564.