Laurent's theorem

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• Laurent's theorem — Math. the theorem that a function that is analytic on an annulus can be represented by a Laurent series on the annulus. [see LAURENT SERIES] …   Useful english dictionary

• Laurent Schwartz — Nacimiento 5 de marzo de 1915 París, Francia Fallecimiento 4 de julio de 2002 París, Francia Nacionalidad …   Wikipedia Español

• Laurent series — A Laurent series is defined with respect to a particular point c and a path of integration γ. The path of integration must lie in an annulus (shown here in red) inside of which f(z) is holomorphic (analytic). In mathematics, the Laurent series of …   Wikipedia

• Taylor's theorem — In calculus, Taylor s theorem gives a sequence of approximations of a differentiable function around a given point by polynomials (the Taylor polynomials of that function) whose coefficients depend only on the derivatives of the function at that… …   Wikipedia

• Beauville–Laszlo theorem — In mathematics, the Beauville–Laszlo theorem is a result in commutative algebra and algebraic geometry that allows one to glue two sheaves over an infinitesimal neighborhood of a point on an algebraic curve. It was proved by Harvard… …   Wikipedia

• Ax–Kochen theorem — The Ax–Kochen theorem, named for James Ax and Simon B. Kochen, states that for each positive integer d there is a finite set Yd of prime numbers, such that if p is any prime not in Yd then every homogeneous polynomial of degree d over the p adic… …   Wikipedia

• Weierstrass–Casorati theorem — The Casorati Weierstrass theorem in complex analysis describes the remarkable behavior of meromorphic functions near essential singularities. It is named for Karl Theodor Wilhelm Weierstrass and Felice Casorati.Start with an open subset U of the… …   Wikipedia

• Malgrange–Ehrenpreis theorem — In mathematics, the Malgrange–Ehrenpreis theorem states that every non zero linear differential operator with constant coefficients has a Green s function. It was first proved independently by Leon Ehrenpreis (1954, 1955) and Bernard… …   Wikipedia

• Mnev's universality theorem — In algebraic geometry, Mnev s universality theorem is a result which can be used to represent algebraic (or semi algebraic) varieties as realizations of oriented matroids, a notion of combinatorics. Contents 1 Oriented matroids 2 Stable… …   Wikipedia

• Sazonov's theorem — In mathematics, Sazonov s theorem is a theorem in functional analysis. It states that a bounded linear operator between two Hilbert spaces is gamma; radonifying if it is Hilbert Schmidt. The result is also important in the study of stochastic… …   Wikipedia