An explicit cycle map for the motivic cohomology of real varieties (Q2403291)
From MaRDI portal
scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | An explicit cycle map for the motivic cohomology of real varieties |
scientific article |
Statements
An explicit cycle map for the motivic cohomology of real varieties (English)
0 references
8 September 2017
0 references
Summary: We provide a direct construction of a cycle map in the level of representing complexes from the motivic cohomology of real (or complex) varieties to the appropriate ordinary cohomology theory. For complex varieties, this is simply integral Betti cohomology, whereas for real varieties the recipient theory is the bigraded \(\mathrm{Gal}(\mathbb{C}/\mathbb{R})\)-equivariant cohomology [\textit{G. Lewis} et al., Bull. Am. Math. Soc., New Ser. 4, 208--212 (1981; Zbl 0477.55009)]. Using the finite analytic correspondences from \textit{P. F. dos Santos} et al. [Contemp. Math. 646, 19--40 (2015; Zbl 1346.14052)] we provide a sheaf-theoretic approach to ordinary equivariant \(RO(G)\)-graded cohomology for any finite group \(G\). In particular, this gives a complex of sheaves \(\mathbb{Z}(p)_\omega\) on a suitable equivariant site of real analytic manifolds-with-corner whose construction closely parallels that of the Voevodsky's motivic complexes \(\mathbb{Z}(p)_{\mathcal{M}}\). Our cycle map is induced by the change of sites functor that assigns to a real variety \(X\) its analytic space \(X(\mathbb{C})\) together with the complex conjugation involution.
0 references
ordinary equivariant cohomology
0 references
motivic cohomology
0 references
cycle map
0 references
finite analytic currents
0 references
real varieties
0 references