Weierstrass's Elliptic Functions: Mathematics, Elliptic Function, Karl Weierstrass, Upper half-plane, Modular Form, Automorphic Form, Fundamental Pair ... Eisenstein Series, Homogeneous Function - Softcover
Synopsis
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. The Weierstrass elliptic function can be defined in three closely related ways, each of which possesses certain advantages. One is as a function of a complex variable z and a lattice Λ in the complex plane. Another is in terms of z and two complex numbers ω1 and ω2 defining a pair of generators, or periods, for the lattice. The third is in terms z and of a modulus τ in the upper half-plane. This is related to the previous definition by τ = ω2 / ω1, which by the conventional choice on the pair of periods is in the upper half-plane. Using this approach, for fixed z the Weierstrass functions become modular functions of τ.
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Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. The Weierstrass elliptic function can be defined in three closely related ways, each of which possesses certain advantages. One is as a function of a complex variable z and a lattice Λ in the complex plane. Another is in terms of z and two complex numbers ω1 and ω2 defining a pair of generators, or periods, for the lattice. The third is in terms z and of a modulus τ in the upper half-plane. This is related to the previous definition by τ = ω2 / ω1, which by the conventional choice on the pair of periods is in the upper half-plane. Using this approach, for fixed z the Weierstrass functions become modular functions of τ.
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Weierstrass's Elliptic Functions
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Taschenbuch. Condition: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -High Quality Content by WIKIPEDIA articles! The Weierstrass elliptic function can be defined in three closely related ways, each of which possesses certain advantages. One is as a function of a complex variable z and a lattice in the complex plane. Another is in terms of z and two complex numbers 1 and 2 defining a pair of generators, or periods, for the lattice. The third is in terms z and of a modulus in the upper half-plane. This is related to the previous definition by = 2 / 1, which by the conventional choice on the pair of periods is in the upper half-plane. Using this approach, for fixed z the Weierstrass functions become modular functions of . Englisch. Seller Inventory # 9786130364083
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Weierstrass's Elliptic Functions : Mathematics, Elliptic Function, Karl Weierstrass, Upper half-plane, Modular Form, Automorphic Form, Fundamental Pair of Periods, Eisenstein Series, Homogeneous Function
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Taschenbuch. Condition: Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - High Quality Content by WIKIPEDIA articles! The Weierstrass elliptic function can be defined in three closely related ways, each of which possesses certain advantages. One is as a function of a complex variable z and a lattice in the complex plane. Another is in terms of z and two complex numbers 1 and 2 defining a pair of generators, or periods, for the lattice. The third is in terms z and of a modulus in the upper half-plane. This is related to the previous definition by = 2 / 1, which by the conventional choice on the pair of periods is in the upper half-plane. Using this approach, for fixed z the Weierstrass functions become modular functions of . Seller Inventory # 9786130364083
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