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Factorization centers in dimension two and the Grothendieck ring of varieties
Abstract: We initiate the study of factorization centers of birational maps, and complete it for surfaces over a perfect field in this article. We prove that for every birational automorphism φ : X X of a smooth projective surface X over a perfect field k, the blowup centers are isomorphic to the blowdown centers in every weak factorization of φ. This implies that nontrivial L-equivalences of 0-dimensional varieties cannot be constructed based on birational automorphisms of a surface. It also implies that rationality ce…
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2023
2023
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“…The difference of classes of exceptional loci in (9.1) is nonzero due to Proposition 26 below. This gives an instance where the refinement of the invariant c(φ) in [LSZ20], [LS22] using group actions yields new information.…”
Section: Geometric Applicationmentioning
confidence: 99%
“…The difference of classes of exceptional loci in (9.1) is nonzero due to Proposition 26 below. This gives an instance where the refinement of the invariant c(φ) in [LSZ20], [LS22] using group actions yields new information.…”
Section: Geometric Applicationmentioning
confidence: 99%
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