Carcinogen
发表于 2025-3-23 10:10:12
Modular Equations of Degrees 3, 5, and 7 and Associated Theta-Function Identities,in regard to Ramanujan’s methods of proof. Undoubtedly, many of the proofs given here are quite unlike those found by Ramanujan. He evidently possessed methods that we have been unable to discern. No hints whatsoever of his methods are provided by Ramanujan.
没有希望
发表于 2025-3-23 17:09:34
Modular Equations of Higher and Composite Degrees,nd 7 were derived. Modular equations of degrees 11, 13, 17, 19, 23, 31, 47, and 71 are established in this chapter. Also, modular equations of composite degree, or “mixed” modular equations, are studied. Most of the equations of the latter type involve four distinct moduli, and so we begin by defini
结果
发表于 2025-3-23 20:42:00
Book 1991undertaken. In 1977, Berndt began the tasks of editing Ramanujan‘s notebooks. Proofs are provided to theorems not yet proven in previous literature, and many results are so startling and different that there are no results akin to them in the literature.
Palate
发表于 2025-3-24 01:45:46
iting was undertaken. In 1977, Berndt began the tasks of editing Ramanujan‘s notebooks. Proofs are provided to theorems not yet proven in previous literature, and many results are so startling and different that there are no results akin to them in the literature.978-1-4612-6963-2978-1-4612-0965-2
uveitis
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没有贫穷
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poliosis
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Fundamental Properties of Elliptic Functions,classical notation and terminology from the theory of elliptic functions and integrals. In Section 6, we identify the functions and parameters employed by Ramanujan with the more familiar notations in the theory of elliptic functions.
leniency
发表于 2025-3-24 17:58:39
The Jacobian Elliptic Functions,ptic function parameters. This chapter contains further series identities depending on the theory of elliptic functions. Such results are considerably fewer in number here than in Chapter 17 and generally are more difficult to prove. In particular, see Sections 4-7.
Veneer
发表于 2025-3-24 23:00:25
Book 1991ical results without proofs in notebooks. Upon Ramanujan‘s death in 1920, G.H. Hardy strongly urged that Ramanujan‘s notebooks be published and edited. The English mathematicians G.N. Watson and B.M. Wilson began this task in 1929, but although they devoted nearly ten years to the project, the work
Institution
发表于 2025-3-25 00:56:23
opics such as spatial big data, smart-phone GIS, urban computing and mobile recommender systems. It also expands the first edition’s rich set of GIS-related commercial and societal applications such as geo-targeting, geo-fencing and understanding climate changes, while enabling more comprehensive co