Computations of Chow-Witt groups for split quadrics and other smooth varieties
Principal Investigator
Prof. Dr. J. Hornbostel (Wuppertal)Dr. M. Zibrowius (Düsseldorf)
Scientific Staff
Heng Xie (01.06.2018-30.05.2021) heng.xie@math.uni-wuppertal.de
Dr. M. Zibrowius (Düsseldorf)
Project description
Chow-Witt groups are refinements of the classical Chow groups. They contain important invariants of algebraic varieties. For example, they contain the "Euler class", which encodes the splitting behaviour of vector bundles over affine bases. The aim of this project is to compute the Chow-Witt groups of certain families of smooth varieties. Our initial focus will be on split quadrics, as results for these promise to have implications for the classical problem of the existence of sums-of-squares formulas. Next, we will investigate other classes of examples (other homogeneous spaces, smooth curves, ...). The Witt groups and the hermitian K-groups are already partially understood for these spaces, and the Chow-Witt groups are closely related to these via motivic spectral sequences.Related publications
Published articles
J. Hornbostel, H. Xie and M. Zibrowius, Chow-Witt rings of split quadrics, in Motivic homotopy theory and refined enumerative geometry, Contemp. Math. vol. 745 (2020), 123-161.
J. Hornbostel, M. Wendt, H. Xie and M. Zibrowius, The real cycle class map arxiv 1911.04150 to appear in the Annals of K-Theory.
Preprints
F. Jin and H. Xie, A Gersten complex on real schemes arxiv 2007.04625