Cycle classes in overconvergent rigid cohomology and a semistable Lefschetz $(1, 1)$ theorem. (2nd May 2019)

Record Type:: Journal Article
Title:: Cycle classes in overconvergent rigid cohomology and a semistable Lefschetz $(1, 1)$ theorem. (2nd May 2019)
Main Title:: Cycle classes in overconvergent rigid cohomology and a semistable Lefschetz $(1, 1)$ theorem
Authors:: Lazda, Christopher
Pál, Ambrus
Abstract:: Abstract : In this paper we prove a semistable version of the variational Tate conjecture for divisors in crystalline cohomology, showing that for $k$ a perfect field of characteristic $p$, a rational (logarithmic) line bundle on the special fibre of a semistable scheme over $k\unicode[STIX]{x27E6}t\unicode[STIX]{x27E7}$ lifts to the total space if and only if its first Chern class does. The proof is elementary, using standard properties of the logarithmic de Rham–Witt complex. As a corollary, we deduce similar algebraicity lifting results for cohomology classes on varieties over global function fields. Finally, we give a counter-example to show that the variational Tate conjecture for divisors cannot hold with $\mathbb{Q}_{p}$ -coefficients.
Is Part Of:: Compositio mathematica. Volume 155:Number 5(2019)
Journal:: Compositio mathematica
Issue:: Volume 155:Number 5(2019)
Issue Display:: Volume 155, Issue 5 (2019)
Year:: 2019
Volume:: 155
Issue:: 5
Issue Sort Value:: 2019-0155-0005-0000
Page Start:: 1025
Page End:: 1045
Publication Date:: 2019-05-02
Subjects:: 14C22 (primary), -- 14F30, -- 11G25 (secondary)
Picard groups, -- crystalline cohomology, -- semistable reduction, -- Tate conjecture
Mathematics -- Periodicals
510
Journal URLs:: http://journals.cambridge.org/action/displayJournal?jid=COM ↗
DOI:: 10.1112/S0010437X19007164 ↗
Languages:: English
ISSNs:: 0010-437X
Deposit Type:: Legaldeposit
View Content:: Available online (eLD content is only available in our Reading Rooms) ↗
Physical Locations:: British Library DSC - 3366.000000
British Library STI - ELD Digital Store
Ingest File:: 22195.xml