An integral structure on rigid cohomology
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If you have a question about this talk, please contact Tom Fisher.
For a quasiprojective smooth variety over a perfect field k of char p we introduce
an overconvergent de Rham-Witt complex by imposing a growth condition on the
de Rham-Witt complex of Deligne-Illusie using Gauus norms and prove that its
hypercohomology defines an integral structure on rigid cohomology, ie its image
in rigid cohomology is a canonical lattice. As a corollary we obtain that the integral
Monsky-Washnitzer cohomology (considered before inverting p) of a smooth k-algebra
is of finite type modulo torsion.
This is joint work with Thomas Zink.
This talk is part of the Number Theory Seminar series.
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Tuesday 31 January 2012, 14:30-15:30