Extending holomorphic forms from the regular locus of a complex space to a resolution of singularities
Stefan Kebekus, Christian Schnell
Abstract
We investigate under what conditions holomorphic forms defined on the regular locus of a reduced complex space extend to holomorphic (or logarithmic) forms on a resolution of singularities. We give a simple necessary and sufficient condition for this, whose proof relies on the Decomposition Theorem and Saito’s theory of mixed Hodge modules. We use it to generalize the theorem of Greb-Kebekus-Kovács-Peternell to complex spaces with rational singularities, and to prove the existence of a functorial pull-back for reflexive differentials on such spaces. We also use our methods to settle the “local vanishing conjecture” proposed by Mustaţă, Olano, and Popa.
Topics & Concepts
Holomorphic functionMathematicsPure mathematicsGravitational singularityLocus (genetics)Complex spaceResolution (logic)Identity theoremComplex manifoldOpen mapping theorem (functional analysis)Resolution of singularitiesSpace (punctuation)Mathematical analysisSimple (philosophy)ConjectureComplex planeStructured program theoremIsolated singularityHodge conjectureAlgebra over a fieldComplex dimensionAlgebraic Geometry and Number TheoryGeometry and complex manifoldsAdvanced Algebra and Geometry