Author: Georges ValironPublisher:
ISBN:
Category :
Languages : en
Pages :
Book Description
Lectures on the General Theory of Integral Functions
Author: Georges ValironGeneral Theory of Integral Functions
Author: Georges ValironLectures on the General Theory of Integral Functions - Primary Source Edition
Author: Georges ValironPublisher: Nabu Press
ISBN: 9781295841134
Category :
Languages : en
Pages : 230
Book Description
This is a reproduction of a book published before 1923. This book may have occasional imperfections such as missing or blurred pages, poor pictures, errant marks, etc. that were either part of the original artifact, or were introduced by the scanning process. We believe this work is culturally important, and despite the imperfections, have elected to bring it back into print as part of our continuing commitment to the preservation of printed works worldwide. We appreciate your understanding of the imperfections in the preservation process, and hope you enjoy this valuable book.
Lectures on the Theory of Integral Equations
Author: I. G. PetrovskiiPublisher: Courier Corporation
ISBN: 9780486697567
Category : Mathematics
Languages : en
Pages : 142
Book Description
Simple, clear exposition of the Fredholm theory for integral equations of the second kind of Fredholm type. A brief treatment of the Volterra equation is also included. An outstanding feature is a table comparing finite dimensional spaces to function spaces. ". . . An excellent presentation."—Am. Math. Monthly. Translated from second revised (1951) Russian edition. Bibliography.
Lectures on the Theory of Elliptic Functions
Author: Harris HancockPublisher: Courier Corporation
ISBN: 9780486438252
Category : Mathematics
Languages : en
Pages : 544
Book Description
Prized for its extensive coverage of classical material, this text is also well regarded for its unusual fullness of treatment and its comprehensive discussion of both theory and applications. The author developes the theory of elliptic integrals, beginning with formulas establishing the existence, formation, and treatment of all three types, and concluding with the most general description of these integrals in terms of the Riemann surface. The theories of Legendre, Abel, Jacobi, and Weierstrass are developed individually and correlated with the universal laws of Riemann. The important contributory theorems of Hermite and Liouville are also fully developed. 1910 ed.
Lectures on the Theory of Elliptic Functions
Author: Harris HancockPublisher: Theclassics.Us
ISBN: 9781230731391
Category :
Languages : en
Pages : 84
Book Description
This historic book may have numerous typos and missing text. Purchasers can usually download a free scanned copy of the original book (without typos) from the publisher. Not indexed. Not illustrated. 1910 edition. Excerpt: ...Possibly the clearest and simplest method of treating this problem is in connection with the Riemann surface upon which the associated integrals may be represented. Before proceeding to the problem of inversion we shall therefore consider this surface in the next Chapter. EXAMPLE 1. If two doubly periodic functions f(z) and jz) have only two poles of the first order in the period-parallelogram and if each pole of the one function coincides with a pole of the other, then is m-cm + c where C and C are constants. CHAPTER VI THE RIEMANN SURFACE Article 108. At the close of the preceding Chapter we were left with the discussion of an integral which contained a radical. Such an expression is two-valued, and we must now consider more closely the meaning of such functions and their associated integrals. Take as simplest case the example 8= Vz-a= (z-a), where 2 is a complex variable and a an arbitrary constant. For the value z = o, we have s = 0; but for all other finite values of z there are two values of s that are equal and of opposite signs. The point a is called a branch-point of s. The point z = 00 is also a branch-point of this function; for-= = 0 for z = 00. Consequently--and likewise s has s V z-a s only one value for z = 00. There are other reasons why z = a and z = 00 are called branchpoints. Corresponding to the value z = zo, let s = s6 l)e a definite value of s. Along the curve (1) from z0 to z consider the values of s at all the points of the curve which differ from one another by infinitesimally small quantities, and similarly consider the values of s along the curve (2) until we again come to z. The value of s at this point will be the same whether we have gone over the first or second curve, provided the...
Canadian Mathematical Bulletin
Author: Lectures on Integral Transforms
Author: Naum Il_ich AkhiezerPublisher: American Mathematical Soc.
ISBN: 0821845241
Category : Mathematics
Languages : en
Pages : 118
Book Description
Focuses on classical integral transforms, principally the Fourier transform, and their applications. This book develops the general theory of the Fourier transform for the space $L DEGREES1(E_n)$ of integrable functions of $n$ var
Lectures on Selected Topics in Mathematical Physics
Author: William A. SchwalmPublisher: Morgan & Claypool Publishers
ISBN: 1681742306
Category : Science
Languages : en
Pages : 67
Book Description
This volume is a basic introduction to certain aspects of elliptic functions and elliptic integrals. Primarily, the elliptic functions stand out as closed solutions to a class of physical and geometrical problems giving rise to nonlinear differential equations. While these nonlinear equations may not be the types of greatest interest currently, the fact that they are solvable exactly in terms of functions about which much is known makes up for this. The elliptic functions of Jacobi, or equivalently the Weierstrass elliptic functions, inhabit the literature on current problems in condensed matter and statistical physics, on solitons and conformal representations, and all sorts of famous problems in classical mechanics. The lectures on elliptic functions have evolved as part of the first semester of a course on theoretical and mathematical methods given to first and second year graduate students in physics and chemistry at the University of North Dakota. They are for graduate students or for researchers who want an elementary introduction to the subject that nevertheless leaves them with enough of the details to address real problems. The style is supposed to be informal. The intention is to introduce the subject as a moderate extension of ordinary trigonometry in which the reference circle is replaced by an ellipse. This entre depends upon fewer tools and has seemed less intimidating that other typical introductions to the subject that depend on some knowledge of complex variables. The first three lectures assume only calculus, including the chain rule and elementary knowledge of differential equations. In the later lectures, the complex analytic properties are introduced naturally so that a more complete study becomes possible.
Lectures on the Theory of Integration
Author: Ralph HenstockPublisher: World Scientific Publishing Company Incorporated
ISBN: 9789971504502
Category : Mathematics
Languages : en
Pages : 0
Book Description
Ch. 1. Introduction. 1. The Riemann and Riemann-Darboux integrals. 2. Modifications using the mesh and refinement of partitions. 3. The calculus indefinite integral and the Riemann-complete or generalized Riemann integral -- ch. 2. Simple properties of the generalized Riemann integral in finite dimensional Euclidean space. 4. Integration over a fixed elementary set. 5. Integration and variation over more than one elementary set. 6. The integrability of functions of brick-point functions. 7. The variation set -- ch. 3. Limit theorems for sequences of functions. 8. Monotone convergence. 9. Bounded Riemann sums and the majorized (dominated) convergence test. 10. Controlled convergence. 11. Necessary and sufficient conditions. 12. Mean convergence and L[symbol] spaces -- ch. 4. Limit theorems for more general convergence, with continuity. 13. Basic theorems. 14. Fatou's lemma and the avoidance of nonmeasurable functions -- ch. 5. Differentiation, measurability, and inner variation. 15. Differentiation of integrals. 16. Limits of step functions -- ch. 6. Cartesian products and the Fubini and Tonelli theorems. 17. Fubini-type theorems. 18. Tonelli-type theorems and the necessary and sufficient condition for reversal of order of double integrals -- ch. 7. applications. 19. Ordinary differential equations. 20. Statistics and probability theory -- ch. 8. History and further discussion. 21. Other integrals. 22. Notes on the previous sections