Derived invariance of the numbers $h^{0,p}(X)$
Roland Abuaf

TL;DR
This paper proves that for derived equivalent smooth projective varieties over complex numbers, the dimensions of the spaces of global sections of their p-th canonical sheaves are equal, establishing an invariance property.
Contribution
It demonstrates the derived invariance of the Hodge numbers $h^{0,p}$ for smooth projective varieties over complex numbers, a previously unknown result.
Findings
$h^{0,p}(X)$ is invariant under derived equivalence.
Derived equivalence preserves certain Hodge numbers.
The result applies to all $p$ for smooth projective varieties.
Abstract
Let and be derived equivalent smooth projective varieties over the field of complex numbers. We prove that the numbers and are equal for any .
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Taxonomy
TopicsAlgebraic Geometry and Number Theory · Advanced Algebra and Geometry · Geometry and complex manifolds
