Weil cohomology theory

In algebraic geometry, a Weil cohomology or Weil cohomology theory is a cohomology satisfying certain axioms concerning the interplay of algebraic cycles and cohomology groups. The name is in honor of André Weil. Any Weil cohomology theory factors uniquely through the of Chow motives, but the category of Chow motives itself is not a Weil cohomology theory, since it is not an . Fix a base field k of arbitrary characteristic and a "coefficient field" K of characteristic zero. A Weil cohomology theory is a contravariant functor satisfying the axioms below. For each smooth projective algebraic variety X of dimension n over k, then the graded K-algebra is required to satisfy the following: is a finite-dimensional K-vector space for each integer i. for each i < 0 or i > 2n. is isomorphic to K (the so-called orientation map). Poincaré duality: there is a perfect pairing There is a canonical Künneth isomorphism For each integer r, there is a cycle map defined on the group of algebraic cycles of codimension r on X, satisfying certain compatibility conditions with respect to functoriality of H and the Künneth isomorphism. If X is a point, the cycle map is required to be the inclusion Z ⊂ K. Weak Lefschetz axiom: For any smooth hyperplane section j: W ⊂ X (i.e. W = X ∩ H, H some hyperplane in the ambient projective space), the maps are isomorphisms for and injections for Hard Lefschetz axiom: Let W be a hyperplane section and be its image under the cycle class map. The Lefschetz operator is defined as where the dot denotes the product in the algebra Then is an isomorphism for i = 1, ..., n. There are four so-called classical Weil cohomology theories: singular (= Betti) cohomology, regarding varieties over C as topological spaces using their analytic topology (see GAGA), de Rham cohomology over a base field of characteristic zero: over C defined by differential forms and in general by means of the complex of Kähler differentials (see algebraic de Rham cohomology), adic cohomology for varieties over fields of characteristic different from , crystalline cohomology.