Green's function estimates for compact K\"ahler manifolds and applications

Abstract

Recent works of Guo-Phong-Song-Sturm established for compact K\"ahler manifolds (even for K\"ahler spaces of specific singularities) a variety of geometric estimates depending on an upper bound of L1+ε or L1( L)n+ε norms of the volume density but not on any curvature bound, in which a key ingredient is a uniform integral estimate for Green's function. Motivated by their results and further applications, in this paper we shall prove an improved (nearly optimal) integral estimate for Green's function under L1+ε volume density condition, and then apply it to obtain improved global geometric estimates. For instance, one of our results states that the kth eigenvalue of Laplacian operator λk c· k1n( k)-3, where n is the complex dimension of the K\"ahler manifold and c depends on n and L1+ε norm of the volume density. Also, our results can be applied to the long-time or volume-noncollapsing finite-time K\"ahler-Ricci flow on compact K\"ahler manifolds and to a general K\"ahler family to further extend previous works of Guo-Phong-Song-Sturm, Guedj-T\o and Vu.