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arXiv:0712.1604 [math.AG]AbstractReferencesReviewsResources

Around the Gysin triangle II

F. Déglise

Published 2007-12-10, updated 2008-11-08Version 2

We study the construction and properties of the Gysin triangle in an axiomatic framework which covers triangulated mixed motives and MGl-modules over an arbitrary base S. This allows to define the Gysin morphism associated to a projective morphism between smooth S-schemes and prove duality for projective smooth S-schemes. As part of the construction, cobordism classes are considered and we give a proof of the Myschenko theorem generalized in our context - this in fact gives another proof of the latter theorem in classical stable homotopy through complex realization. Finally, these constructions apply to rigid cohomology through the notion of a mixed Weil theory introduced by D.-C. Cisinski and the author in another work.

Comments: The major change is a correction of the formula involving multiplicities with a correction term due to the formal group law (i.e. ramification formulas 4.26). Other changes are made according to the report of the referee for Documenta Mathematica, thanks go to him. To appear in Documenta Mathematica
Categories: math.AG, math.AT
Subjects: 14F42, 14F43
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