Oriented Cohomology Rings of Some Moduli Spaces via Blowups

Abstract

Oriented cohomology theories provide a general framework to perform intersection-theory-type calculus. The Chow ring, algebraic K-theory, and Levine--Morel's algebraic cobordism are all instances of such theories satisfying A1-invariance. Topological Hochschild homology, topological cyclic homology, and Hodge cohomology are important examples of theories without A1-invariance. In this paper, we prove an additive blowup formula for oriented cohomology theories in the non- A1-invariant category of motivic spectra, developed by Annala, Hoyois, and Iwasa. Then, we specialize to A1-invariant theories and give presentations of oriented cohomology rings of the blowup of a smooth scheme along a smooth center. We compute explicit examples of such presentations for the cases of del Pezzo surfaces, the blowup of P3 along the twisted cubic, and the blowup of P5 along the Veronese surface, which can be identified with the moduli space of complete conics. We demonstrate that one can recover solutions to classical enumerative geometry problems, such as Steiner's 3264 conics, using arbitrary oriented cohomology theories. Finally, we give a presentation of oriented cohomology rings of M0,n, which generalizes Keel's presentation of the Chow ring.