Spectral rigidity of complex projective spaces, revisited

Abstract

A classical question in spectral geometry is, for each pair of nonnegative integers (p,n) such that p≤ 2n, if the eigenvalues of Laplacian on p-forms of a compact K\"ahler manifold are the same as those of CPn equipped with the Fubini-Study metric, then whether or not this K\"ahler manifold is holomorphically isometric to CPn. For every positive even number p, we affirmatively solve this problem in all dimensions n with at most two possible exceptions. We also clarify in this paper some gaps in previous literature concerned with this question, among which one is related to the volume estimate of Fano K\"ahler-Einstein manifolds.