cartier divisor - very ample divisor : 2024-11-02 cartier divisorIn algebraic geometry, divisors are a generalization of codimension-1 subvarieties of algebraic varieties. Two different generalizations are in common use, Cartier divisors and Weil divisors (named for Pierre Cartier and André Weil by David Mumford). Both are derived from the notion of divisibility in the integers and . See more cartier divisorSale Price: $29,995.00. Availability. Usually ships within 3 months. Condition. Store Display Model. Reference #: 68628-BLUE. Quantity: Add To Cart – Special Order. CLICK TO VIEW IN STOCK ITEMS. JOIN THE WAIT LIST! Write Review. Product Description Authenticity Guaranteed Product Reviews. Model # 68628 | 68628-BLUE.Discover the Datejust 36 watch in Oystersteel and white gold on the Official Rolex site. Model:m126234-0015 See more
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cartier divisorLet X be an integral Noetherian scheme. Then X has a sheaf of rational functions $${\displaystyle {\mathcal {M}}_{X}.}$$ All regular functions are rational functions, which leads to a short exact sequenceA Cartier divisor on . See moreAs a basic result of the (big) Cartier divisor, there is a result called Kodaira's lemma:Let X be a irreducible projective variety and let D be a big Cartier divisor on X and let H be an arbitrary effective Cartier divisor on X. Then See more
cartier divisorvery ample divisorLet φ : X → Y be a morphism of integral locally Noetherian schemes. It is often—but not always—possible to use φ to transfer a divisor D from one scheme to the other. Whether this is possible depends on whether the divisor is a Weil or Cartier divisor, . See moreFor an integral Noetherian scheme X, the natural homomorphism from the group of Cartier divisors to that of Weil divisors gives a homomorphism$${\displaystyle c_{1}:\operatorname {Pic} (X)\to \operatorname {Cl} (X),}$$known as the first See more
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cartier divisor