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2. Birational geometry - Wikipedia

   en.wikipedia.org/wiki/Birational_geometry

   A birational map from X to Y is a rational map f : X ⇢ Y such that there is a rational map Y ⇢ X inverse to f. A birational map induces an isomorphism from a nonempty open subset of X to a nonempty open subset of Y, and vice versa: an isomorphism between nonempty open subsets of X, Y by definition gives a birational map f : X ⇢ Y. In this ...

3. Dan Abramovich - Wikipedia

   en.wikipedia.org/wiki/Dan_Abramovich

   Download as PDF; Printable version ... "Torification and factorization of birational maps". ... "A note on the factorization theorem of toric birational maps after ...

4. Zariski's main theorem - Wikipedia

   en.wikipedia.org/wiki/Zariski's_main_theorem

   A birational morphism with finite fibers to a normal variety is an isomorphism to an open subset. The total transform of a normal fundamental point of a birational map has positive dimension. This is essentially Zariski's original version. The total transform of a normal point under a proper birational morphism is connected.

5. Blowing up - Wikipedia

   en.wikipedia.org/wiki/Blowing_up

   The weak factorization theorem says that every birational map can be factored as a composition of particularly simple blowups. The Cremona group, the group of birational automorphisms of the plane, is generated by blowups. Besides their importance in describing birational transformations, blowups are also an important way of constructing new ...

6. Theorem on formal functions - Wikipedia

   en.wikipedia.org/wiki/Theorem_on_formal_functions

   The canonical map is one obtained by passage to limit. The theorem is used to deduce some other important theorems: Stein factorization and a version of Zariski's main theorem that says that a proper birational morphism into a normal variety is an isomorphism. Some other corollaries (with the notations as above) are:

7. Morphism of algebraic varieties - Wikipedia

   en.wikipedia.org/wiki/Morphism_of_algebraic...

   The composition of regular maps is again regular; thus, algebraic varieties form the category of algebraic varieties where the morphisms are the regular maps. Regular maps between affine varieties correspond contravariantly in one-to-one to algebra homomorphisms between the coordinate rings: if f : X → Y is a morphism of affine varieties ...

8. Rational mapping - Wikipedia

   en.wikipedia.org/wiki/Rational_mapping

   Formally, a rational map: between two varieties is an equivalence class of pairs (,) in which is a morphism of varieties from a non-empty open set to , and two such pairs (,) and (′ ′, ′) are considered equivalent if and ′ ′ coincide on the intersection ′ (this is, in particular, vacuously true if the intersection is empty, but since is assumed irreducible, this is impossible).

9. Iitaka dimension - Wikipedia

   en.wikipedia.org/wiki/Iitaka_dimension

   A line bundle is big if it is of maximal Iitaka dimension, that is, if its Iitaka dimension is equal to the dimension of the underlying variety. Bigness is a birational invariant: If f : Y → X is a birational morphism of varieties, and if L is a big line bundle on X, then f * L is a big line bundle on Y.