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Nombres, Théorie des --- Geometrie algebrique --- Geometrie algebrique
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Geometrie algebrique --- Geometrie non commutative --- Geometrie algebrique --- Geometrie non commutative
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Algebra --- 512 --- 512 Algebra --- Algèbre --- Géométrie algébrique
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Algebraic geometry --- 512 --- Algebra --- Geometry, Algebraic --- Congresses. --- 512 Algebra --- Géométrie algébrique
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Algebraic topology --- 512 --- Algebra --- 512 Algebra --- Fonctions de plusieurs variables complexes --- Géométrie algébrique --- Géométrie algébrique --- Analyse sur une variété
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Algebraic topology --- 512 --- Algebra --- Functor theory. --- Picard schemes. --- 512 Algebra --- Géométrie analytique --- Geometry, Analytic --- Algèbres commutatives --- Géométrie algébrique --- Geometry, Analytic. --- Algèbres commutatives --- Géométrie algébrique --- Géométrie analytique. --- Espaces analytiques
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A comprehensive, self-contained treatment presenting general results of the theory. Establishes a geometric intuition and a working facility with specific geometric practices. Emphasizes applications through the study of interesting examples and the development of computational tools. Coverage ranges from analytic to geometric. Treats basic techniques and results of complex manifold theory, focusing on results applicable to projective varieties, and includes discussion of the theory of Riemann surfaces and algebraic curves, algebraic surfaces and the quadric line complex as well as special topics in complex manifolds.
Algebraic geometry --- Geometry, Algebraic --- #WWIS:d.d. Prof. L. Bouckaert/ALTO --- 512.7 --- Geometry --- Algebraic geometry. Commutative rings and algebras --- Geometry, Algebraic. --- 512.7 Algebraic geometry. Commutative rings and algebras --- Geometrie algebrique --- Courbes algebriques --- Surfaces algebriques
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512.74 --- Moduli theory --- Geometry, Algebraic --- Varieties (Universal algebra) --- Algebras, Varieties of --- Classes, Equational --- Equational classes --- Varieties of algebras --- Variety (Universal algebra) --- Algebra, Universal --- Algebraic geometry --- Geometry --- Theory of moduli --- Analytic spaces --- Functions of several complex variables --- Algebraic groups. Abelian varieties --- 512.74 Algebraic groups. Abelian varieties --- Géométrie algébrique
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Written by Arthur Ogus on the basis of notes from Pierre Berthelot's seminar on crystalline cohomology at Princeton University in the spring of 1974, this book constitutes an informal introduction to a significant branch of algebraic geometry. Specifically, it provides the basic tools used in the study of crystalline cohomology of algebraic varieties in positive characteristic.Originally published in 1978.The Princeton Legacy Library uses the latest print-on-demand technology to again make available previously out-of-print books from the distinguished backlist of Princeton University Press. These editions preserve the original texts of these important books while presenting them in durable paperback and hardcover editions. The goal of the Princeton Legacy Library is to vastly increase access to the rich scholarly heritage found in the thousands of books published by Princeton University Press since its founding in 1905.
Algebraic geometry --- Geometry, Algebraic. --- Homology theory. --- Functions, Zeta. --- Zeta functions --- Cohomology theory --- Contrahomology theory --- Algebraic topology --- Geometry --- Abelian category. --- Additive map. --- Adjoint functors. --- Adjunction (field theory). --- Adjunction formula. --- Alexander Grothendieck. --- Algebra homomorphism. --- Artinian. --- Automorphism. --- Axiom. --- Banach space. --- Base change map. --- Base change. --- Betti number. --- Calculation. --- Cartesian product. --- Category of abelian groups. --- Characteristic polynomial. --- Characterization (mathematics). --- Closed immersion. --- Codimension. --- Coefficient. --- Cohomology. --- Cokernel. --- Commutative diagram. --- Commutative property. --- Commutative ring. --- Compact space. --- Corollary. --- Crystalline cohomology. --- De Rham cohomology. --- Degeneracy (mathematics). --- Derived category. --- Diagram (category theory). --- Differential operator. --- Discrete valuation ring. --- Divisibility rule. --- Dual basis. --- Eigenvalues and eigenvectors. --- Endomorphism. --- Epimorphism. --- Equation. --- Equivalence of categories. --- Exact sequence. --- Existential quantification. --- Explicit formula. --- Explicit formulae (L-function). --- Exponential type. --- Exterior algebra. --- Exterior derivative. --- Formal power series. --- Formal scheme. --- Frobenius endomorphism. --- Functor. --- Fundamental theorem. --- Hasse invariant. --- Hodge theory. --- Homotopy. --- Ideal (ring theory). --- Initial and terminal objects. --- Inverse image functor. --- Inverse limit. --- Inverse system. --- K-theory. --- Leray spectral sequence. --- Linear map. --- Linearization. --- Locally constant function. --- Mapping cone (homological algebra). --- Mathematical induction. --- Maximal ideal. --- Module (mathematics). --- Monomial. --- Monotonic function. --- Morphism. --- Natural transformation. --- Newton polygon. --- Noetherian ring. --- Noetherian. --- P-adic number. --- Polynomial. --- Power series. --- Presheaf (category theory). --- Projective module. --- Scientific notation. --- Series (mathematics). --- Sheaf (mathematics). --- Sheaf of modules. --- Special case. --- Spectral sequence. --- Subring. --- Subset. --- Symmetric algebra. --- Theorem. --- Topological space. --- Topology. --- Topos. --- Transitive relation. --- Universal property. --- Zariski topology. --- Geometrie algebrique --- Topologie algebrique --- Varietes algebriques --- Cohomologie
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