Dolbeault cohomologies of blowing up complex manifolds

Abstract: We prove a blow-up formula for Dolbeault cohomologies of compact complex manifolds by introducing relative Dolbeault cohomology. As corollaries, we present a uniform proof for bimeromorphic invariance of (•, 0)-and (0, •)-Hodge numbers on a compact complex manifold, and obtain the equality for the numbers of the blow-ups and blow-downs in the weak factorization of the bimeromorphic map between two compact complex manifolds with equal (1, 1)-Hodge number or equivalently second Betti number. Many examples of the… Show more

“…Moreover, for the pair (X, H), we also have the (twisted) Hodge-de Rham (or Frölicher) spectral sequence This result is a natural generalization of [10,Theorem 1.6] where the birational invariance of the non-twisted E 1 -degeneracy is also obtained for compact complex threefolds and fourfolds.…”

On the blow-up formula of twisted de Rham cohomology

“…Moreover, for the pair (X, H), we also have the (twisted) Hodge-de Rham (or Frölicher) spectral sequence This result is a natural generalization of [10,Theorem 1.6] where the birational invariance of the non-twisted E 1 -degeneracy is also obtained for compact complex threefolds and fourfolds.…”

On the blow-up formula of twisted de Rham cohomology

“…[15]). In fact, the Kähler hypothesis can be dropped and several formulas for the de Rham, Dolbeault and Bott-Chern cohomologies can be found in [10], [16], [8], [8], [7], [2]. Here we discuss a blow-up formula for the Dolbeault cohomology in terms of the relative cohomology groups which follows directly by the previous results and which finds further applications in [2].…”

“…This blow-up formula for the Dolbeault cohomology will find further applications in [2]. For other formulas of this kind we refer the reader to [16], [8], [8], [10], [7].…”

“…Notice that in [8] and [9] the authors prove a Dolbeault blow-up formula using a sheaftheoretic approach. However their definition of relative Dolbeault cohomology is different from Suwa's one.…”

Relative Čech–Dolbeault homology and applications

“…In Section 4, we introduce the notation of relative Dolbeault sheaves associated to the blow-up morphism. In Section 5, we use the preparations of Sections 2-4 to give the first proof of the main result (Theorem 1.2), following the full approach of [32] v3 . Finally, Section 6 contains some applications of Theorem 1.2.…”

Dolbeault cohomologies of blowing up complex manifolds II: Bundle-valued case