The Analytical Theory of Heat PDF Download
Are you looking for read ebook online? Search for your book and save it on your Kindle device, PC, phones or tablets. Download The Analytical Theory of Heat PDF full book. Access full book title The Analytical Theory of Heat by Jean-Baptiste-Joseph Fourier. Download full books in PDF and EPUB format.
Author: Jean-Baptiste-Joseph Fourier
Publisher:
ISBN:
Category : Heat
Languages : en
Pages : 534
Get Book Here
Book Description
Author: Jean-Baptiste-Joseph Fourier
Publisher:
ISBN:
Category : Heat
Languages : en
Pages : 534
Get Book Here
Book Description
Author: Roger L. Easton Jr.
Publisher: John Wiley & Sons
ISBN: 1119991862
Category : Technology & Engineering
Languages : en
Pages : 1005
Get Book Here
Book Description
Fourier Methods in Imaging introduces the mathematical tools for modeling linear imaging systems to predict the action of the system or for solving for the input. The chapters are grouped into five sections, the first introduces the imaging “tasks” (direct, inverse, and system analysis), the basic concepts of linear algebra for vectors and functions, including complex-valued vectors, and inner products of vectors and functions. The second section defines "special" functions, mathematical operations, and transformations that are useful for describing imaging systems. Among these are the Fourier transforms of 1-D and 2-D function, and the Hankel and Radon transforms. This section also considers approximations of the Fourier transform. The third and fourth sections examine the discrete Fourier transform and the description of imaging systems as linear "filters", including the inverse, matched, Wiener and Wiener-Helstrom filters. The final section examines applications of linear system models to optical imaging systems, including holography. Provides a unified mathematical description of imaging systems. Develops a consistent mathematical formalism for characterizing imaging systems. Helps the reader develop an intuitive grasp of the most common mathematical methods, useful for describing the action of general linear systems on signals of one or more spatial dimensions. Offers parallel descriptions of continuous and discrete cases. Includes many graphical and pictorial examples to illustrate the concepts. This book helps students develop an understanding of mathematical tools for describing general one- and two-dimensional linear imaging systems, and will also serve as a reference for engineers and scientists
Author: Jack D. Gaskill
Publisher: John Wiley & Sons
ISBN: 0471292885
Category : Science
Languages : en
Pages : 580
Get Book Here
Book Description
A complete and balanced account of communication theory, providing an understanding of both Fourier analysis (and the concepts associated with linear systems) and the characterization of such systems by mathematical operators. Presents applications of the theories to the diffraction of optical wave-fields and the analysis of image-forming systems. Emphasizes a strong mathematical foundation and includes an in-depth consideration of the phenomena of diffraction. Combines all theories to describe the image-forming process in terms of a linear filtering operation for both coherent and incoherent imaging. Chapters provide carefully designed sets of problems. Also includes extensive tables of properties and pairs of Fourier transforms and Hankle Transforms.
Author: Ronald Newbold Bracewell
Publisher:
ISBN:
Category : Fourier transformations
Languages : en
Pages :
Get Book Here
Book Description
Author: Ivor Grattan-Guinness
Publisher:
ISBN: 9780262571784
Category : Biography & Autobiography
Languages : en
Pages : 530
Get Book Here
Book Description
Beyond being the first substantial publication on Fourier, this work contains the text of Fourier's seminal paper of 1807 on the propagation of heat, marking the first time it has ever appeared in print. This paper incorporates many of the mathematical creations on which Fourier's fame rests, including derivation of the diffusion equation, the separation of the treatment of surface phenomena from internal phenomena, the use of boundary values and initial conditions, and the development of "Fourier series" and the so-called "Bessel functions."When submitted to the examiners of the Institut de France, the originality of the paper and the surprising nature of some of its mathematical revelations caused great controversy, and it was denied publication both in 1807 and in later years. Fourier had the support, among the examiners, of Laplace and Monge, but Lagrange was adamantly in opposition, so that Fourier's work did not appear in print until 1822, reworked into book form.Fourier's mathematical discoveries are intimately related to his interest in the solution of physical problems and their experimental verification. The mathematical methods he developed in connection with heat diffusion apply to physical situations far beyond the boundaries of this area. Generally, Fourier may be credited with one of the first major extensions of mathematical physics beyond the applications of Newton's laws of motion and universal gravitation.The opening biographical chapter of this book follows Fourier's career up to the submission of the 1807 paper, and the two closing chapters take up his life and work from that point on. Fourier had strong political motivations and spent much of his life in the public service. These chapters trace his political difficulties, both before and after 1807, when he was the prefect of a department of France and was subjected to the dislocations of Napoleon's ups and downs. These chapters also describe aspects of the turbulent but productive development of French science from the Revolution to 1830.The core of the book presents the paper of 1807 in its original French and with the original notation. Grattan-Guinness has divided the paper into sections by the sequence of the problems taken up, and he introduces and, where necessary, closes each section with commentary relevant to Fourier's later work in these areas. The paper itself (cllows the chronology of Fourier's discoveries, and among the topics treated are, in this order: heat diffusion between disjoint bodies and in continuous bodies; the appearance of partial differential equations; the special solution for the lamina; sine and cosine series for an arbitrary function; reflections on the vibrating string problem; solution for the annulus; the full Fourier series for an arbitrary function; reflections on n-body analysis; solution for the sphere; solution for the cylinder; steady-state diffusion in the rectangular prism; time-dependent diffusion in the cube; and Fourier's experimental work.
Author: Nicholas Valentine Riasanovsky
Publisher: Univ of California Press
ISBN: 9780520014053
Category : Biography & Autobiography
Languages : en
Pages : 272
Get Book Here
Book Description
Author: Charles Fourier
Publisher: Cambridge University Press
ISBN: 1316583406
Category : Political Science
Languages : en
Pages : 366
Get Book Here
Book Description
This remarkable book, written soon after the French Revolution, has traditionally been considered one of the founding documents in the history of socialism. It introduces the best-known and most extraordinary utopia written in the last two centuries. Charles Fourier was among the first to formulate a right to a minimum standard of life. His radical approach involved a systematic critique of work, marriage and patriarchy, together with a parallel right to a sexual minimum. He also proposed a comprehensive alternative to the Christian religion. Finally, through the medium of a bizarre and extraordinary cosmology, Fourier argued that the poor state of the planet is the result of the evil practices of civilisation. Translated into English, this classic text will be of particular interest to students and scholars of the history of sexuality and feminism, political thought and socialism.
Author: Transnational College of LEX.
Publisher:
ISBN:
Category : Biography & Autobiography
Languages : en
Pages : 462
Get Book Here
Book Description
Many people give up on math in high school - they do not feel comfortable with it, or they do not see the need for it in everyday life. These "mathematically-challenged" people may have had little recourse available in the past. Now, however, there is LRF's Who is Fourier?, which takes readers gently by the hand and helps them with both simple and intimidating concepts alike. By using everyday examples it enables the reader to develop an understanding of the language of Fourier's wave analysis. For instance, Fourier Series is explained with a comparison to the contents of 'Veggie-veggie' juice! The student authors take the reader along on their adventure of discovery, creating an interactive work that gradually moves from the very basics ("What is a right triangle?") to the more complicated mathematics of trigonometry, exponentiation, differentiation, and integration. This is done in a way that is not only easy to understand, but actually enjoyable.
Author: Frédéric Barbaresco
Publisher: MDPI
ISBN: 3038977462
Category : Science
Languages : en
Pages : 260
Get Book Here
Book Description
For the 250th birthday of Joseph Fourier, born in 1768 in Auxerre, France, this MDPI Special Issue will explore modern topics related to Fourier Analysis and Heat Equation. Modern developments of Fourier analysis during the 20th century have explored generalizations of Fourier and Fourier–Plancherel formula for non-commutative harmonic analysis, applied to locally-compact, non-Abelian groups. In parallel, the theory of coherent states and wavelets has been generalized over Lie groups. One should add the developments, over the last 30 years, of the applications of harmonic analysis to the description of the fascinating world of aperiodic structures in condensed matter physics. The notions of model sets, introduced by Y. Meyer, and of almost periodic functions, have revealed themselves to be extremely fruitful in this domain of natural sciences. The name of Joseph Fourier is also inseparable from the study of the mathematics of heat. Modern research on heat equations explores the extension of the classical diffusion equation on Riemannian, sub-Riemannian manifolds, and Lie groups. In parallel, in geometric mechanics, Jean-Marie Souriau interpreted the temperature vector of Planck as a space-time vector, obtaining, in this way, a phenomenological model of continuous media, which presents some interesting properties. One last comment concerns the fundamental contributions of Fourier analysis to quantum physics: Quantum mechanics and quantum field theory. The content of this Special Issue will highlight papers exploring non-commutative Fourier harmonic analysis, spectral properties of aperiodic order, the hypoelliptic heat equation, and the relativistic heat equation in the context of Information Theory and Geometric Science of Information.
Author: Steven B. Damelin
Publisher: Cambridge University Press
ISBN: 1107013224
Category : Mathematics
Languages : en
Pages : 463
Get Book Here
Book Description
Develops mathematical and probabilistic tools needed to give rigorous derivations and applications of fundamental results in signal processing theory.
