Volterra Integral Equations
Author | : Hermann Brunner |
Publisher | : Cambridge University Press |
Total Pages | : 405 |
Release | : 2017-01-20 |
ISBN-10 | : 9781107098725 |
ISBN-13 | : 1107098726 |
Rating | : 4/5 (25 Downloads) |
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Author | : Hermann Brunner |
Publisher | : Cambridge University Press |
Total Pages | : 405 |
Release | : 2017-01-20 |
ISBN-10 | : 9781107098725 |
ISBN-13 | : 1107098726 |
Rating | : 4/5 (25 Downloads) |
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Author | : G. Gripenberg |
Publisher | : Cambridge University Press |
Total Pages | : 727 |
Release | : 1990 |
ISBN-10 | : 9780521372893 |
ISBN-13 | : 0521372895 |
Rating | : 4/5 (93 Downloads) |
This book looks at the theories of Volterra integral and functional equations.
Author | : Hermann Brunner |
Publisher | : Cambridge University Press |
Total Pages | : 620 |
Release | : 2004-11-15 |
ISBN-10 | : 0521806151 |
ISBN-13 | : 9780521806152 |
Rating | : 4/5 (51 Downloads) |
Collocation based on piecewise polynomial approximation represents a powerful class of methods for the numerical solution of initial-value problems for functional differential and integral equations arising in a wide spectrum of applications, including biological and physical phenomena. The present book introduces the reader to the general principles underlying these methods and then describes in detail their convergence properties when applied to ordinary differential equations, functional equations with (Volterra type) memory terms, delay equations, and differential-algebraic and integral-algebraic equations. Each chapter starts with a self-contained introduction to the relevant theory of the class of equations under consideration. Numerous exercises and examples are supplied, along with extensive historical and bibliographical notes utilising the vast annotated reference list of over 1300 items. In sum, Hermann Brunner has written a treatise that can serve as an introduction for students, a guide for users, and a comprehensive resource for experts.
Author | : Abdul-Majid Wazwaz |
Publisher | : Springer Science & Business Media |
Total Pages | : 639 |
Release | : 2011-11-24 |
ISBN-10 | : 9783642214493 |
ISBN-13 | : 3642214495 |
Rating | : 4/5 (93 Downloads) |
Linear and Nonlinear Integral Equations: Methods and Applications is a self-contained book divided into two parts. Part I offers a comprehensive and systematic treatment of linear integral equations of the first and second kinds. The text brings together newly developed methods to reinforce and complement the existing procedures for solving linear integral equations. The Volterra integral and integro-differential equations, the Fredholm integral and integro-differential equations, the Volterra-Fredholm integral equations, singular and weakly singular integral equations, and systems of these equations, are handled in this part by using many different computational schemes. Selected worked-through examples and exercises will guide readers through the text. Part II provides an extensive exposition on the nonlinear integral equations and their varied applications, presenting in an accessible manner a systematic treatment of ill-posed Fredholm problems, bifurcation points, and singular points. Selected applications are also investigated by using the powerful Padé approximants. This book is intended for scholars and researchers in the fields of physics, applied mathematics and engineering. It can also be used as a text for advanced undergraduate and graduate students in applied mathematics, science and engineering, and related fields. Dr. Abdul-Majid Wazwaz is a Professor of Mathematics at Saint Xavier University in Chicago, Illinois, USA.
Author | : Peter Linz |
Publisher | : SIAM |
Total Pages | : 240 |
Release | : 1985-01-01 |
ISBN-10 | : 1611970857 |
ISBN-13 | : 9781611970852 |
Rating | : 4/5 (57 Downloads) |
Presents an aspect of activity in integral equations methods for the solution of Volterra equations for those who need to solve real-world problems. Since there are few known analytical methods leading to closed-form solutions, the emphasis is on numerical techniques. The major points of the analytical methods used to study the properties of the solution are presented in the first part of the book. These techniques are important for gaining insight into the qualitative behavior of the solutions and for designing effective numerical methods. The second part of the book is devoted entirely to numerical methods. The author has chosen the simplest possible setting for the discussion, the space of real functions of real variables. The text is supplemented by examples and exercises.
Author | : Richard K. Miller |
Publisher | : |
Total Pages | : 488 |
Release | : 1971 |
ISBN-10 | : UCAL:B4406105 |
ISBN-13 | : |
Rating | : 4/5 (05 Downloads) |
Author | : Stephen M. Zemyan |
Publisher | : Springer Science & Business Media |
Total Pages | : 350 |
Release | : 2012-07-10 |
ISBN-10 | : 9780817683498 |
ISBN-13 | : 0817683496 |
Rating | : 4/5 (98 Downloads) |
The Classical Theory of Integral Equations is a thorough, concise, and rigorous treatment of the essential aspects of the theory of integral equations. The book provides the background and insight necessary to facilitate a complete understanding of the fundamental results in the field. With a firm foundation for the theory in their grasp, students will be well prepared and motivated for further study. Included in the presentation are: A section entitled Tools of the Trade at the beginning of each chapter, providing necessary background information for comprehension of the results presented in that chapter; Thorough discussions of the analytical methods used to solve many types of integral equations; An introduction to the numerical methods that are commonly used to produce approximate solutions to integral equations; Over 80 illustrative examples that are explained in meticulous detail; Nearly 300 exercises specifically constructed to enhance the understanding of both routine and challenging concepts; Guides to Computation to assist the student with particularly complicated algorithmic procedures. This unique textbook offers a comprehensive and balanced treatment of material needed for a general understanding of the theory of integral equations by using only the mathematical background that a typical undergraduate senior should have. The self-contained book will serve as a valuable resource for advanced undergraduate and beginning graduate-level students as well as for independent study. Scientists and engineers who are working in the field will also find this text to be user friendly and informative.
Author | : Andrei D. Polyanin |
Publisher | : CRC Press |
Total Pages | : 1143 |
Release | : 2008-02-12 |
ISBN-10 | : 9780203881057 |
ISBN-13 | : 0203881052 |
Rating | : 4/5 (57 Downloads) |
Unparalleled in scope compared to the literature currently available, the Handbook of Integral Equations, Second Edition contains over 2,500 integral equations with solutions as well as analytical and numerical methods for solving linear and nonlinear equations. It explores Volterra, Fredholm, WienerHopf, Hammerstein, Uryson, and other equa
Author | : F. G. Tricomi |
Publisher | : Courier Corporation |
Total Pages | : 256 |
Release | : 2012-04-27 |
ISBN-10 | : 9780486158303 |
ISBN-13 | : 0486158306 |
Rating | : 4/5 (03 Downloads) |
Authoritative, well-written treatment of extremely useful mathematical tool with wide applications. Topics include Volterra Equations, Fredholm Equations, Symmetric Kernels and Orthogonal Systems of Functions, more. Advanced undergraduate to graduate level. Exercises. Bibliography.
Author | : Wolfgang Hackbusch |
Publisher | : Birkhäuser |
Total Pages | : 377 |
Release | : 2012-12-06 |
ISBN-10 | : 9783034892155 |
ISBN-13 | : 3034892152 |
Rating | : 4/5 (55 Downloads) |
The theory of integral equations has been an active research field for many years and is based on analysis, function theory, and functional analysis. On the other hand, integral equations are of practical interest because of the «boundary integral equation method», which transforms partial differential equations on a domain into integral equations over its boundary. This book grew out of a series of lectures given by the author at the Ruhr-Universitat Bochum and the Christian-Albrecht-Universitat zu Kiel to students of mathematics. The contents of the first six chapters correspond to an intensive lecture course of four hours per week for a semester. Readers of the book require background from analysis and the foundations of numeri cal mathematics. Knowledge of functional analysis is helpful, but to begin with some basic facts about Banach and Hilbert spaces are sufficient. The theoretical part of this book is reduced to a minimum; in Chapters 2, 4, and 5 more importance is attached to the numerical treatment of the integral equations than to their theory. Important parts of functional analysis (e. g. , the Riesz-Schauder theory) are presented without proof. We expect the reader either to be already familiar with functional analysis or to become motivated by the practical examples given here to read a book about this topic. We recall that also from a historical point of view, functional analysis was initially stimulated by the investigation of integral equations.