Higher-Page Bott-Chern and Aeppli Cohomologies and Applications

Abstract

For every positive integer r, we introduce two new cohomologies, that we call Er-Bott-Chern and Er-Aeppli, on compact complex manifolds. When r=1, they coincide with the usual Bott-Chern and Aeppli cohomologies, but they are coarser, respectively finer, than these when r≥ 2. They provide analogues in the Bott-Chern-Aeppli context of the Er-cohomologies featuring in the Fr\"olicher spectral sequence of the manifold. We apply these new cohomologies in several ways to characterise the notion of page-(r-1)-∂∂-manifolds that we introduced very recently. We also prove analogues of the Serre duality for these higher-page Bott-Chern and Aeppli cohomologies and for the spaces featuring in the Fr\"olicher spectral sequence. We obtain a further group of applications of our cohomologies to the study of Hermitian-symplectic and strongly Gauduchon metrics for which we show that they provide the natural cohomological framework.