Congruences for the Number of Rational Points, Hodge Type and Motivic Conjectures for Fano Varieties

Spencer Bloch; Helene Esnault

Congruences for the Number of Rational Points, Hodge Type and Motivic Conjectures for Fano Varieties

Spencer Bloch bloch@math.uchicago.edu
Helene Esnault esnault@uni-essen.de

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Abstract

A fano variety is a smooth, geometrically connected variety over a field, for which the dualizing sheaf is anti-ample. For example the projective space, more generally flag varieties are Fano varieties, as well as hypersurfaces of degree d â‰¤ ð‘› in â„™^ð‘›. We discuss the existence and number of rational points over a finite field, the Hodge type over the complex numbers, and the motivic conjectures which are controlling those invariants. We present a geometric version of it.

Spencer Bloch University of Chicago, Mathematics, IL 60 636, Chicago, USA.
Helene Esnault Mathematik, Universität Essen, FB6, Mathematik, 45117 Essen, Germany.

Pages: 248–259
Date Published: 2003-10-01
Vol. 5 No. 3 (2003): CUBO, Matemática Educacional

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Published

2003-10-01

How to Cite

[1]

S. Bloch and H. Esnault, “Congruences for the Number of Rational Points, Hodge Type and Motivic Conjectures for Fano Varieties”, CUBO, vol. 5, no. 3, pp. 248–259, Oct. 2003.