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Calculus of Variations has 19 ratings and 0 reviews. This text is basically divided into two parts. Chapters 1–4 include background material. Calculus of Variations, With Applications to Physics and Engineering – Weinstock R – Free ebook download as PDF File .pdf) or read book online for free. Synge, J. L. Review: Robert Weinstock, Calculus of variations with applications to physics and engineering. Bull. Amer. Math. Soc. 59 (), no. 4,

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Calculus of Variations by Robert Weinstock

By using our website you agree to our use of cookies. Dispatched from the UK in 10 business days When will my order arrive? Home Contact Us Help Free delivery worldwide. Description This book by Robert Weinstock was written to fill the need for a basic introduction to the calculus of variations. Simply and easily written, with an emphasis on the applications of this calculus, it has long been a standard reference of physicists, engineers, and applied mathematicians.

The author begins slowly, introducing the reader to the calculus of variations, and supplying lists of essential formulae and derivations. Later chapters cover isoperimetric problems, geometrical optics, Fermat’s principle, dynamics of particles, the Sturm-Liouville eigenvalue-eigenfunction problem, the theory of elasticity, quantum mechanics, and electrostatics.

Each chapter ends with a series of exercises which should prove very useful in determining whether the material in that chapter has been thoroughly grasped. The clarity of exposition makes this book easily accessible to anyone who has mastered first-year calculus with some exposure to ordinary differential equations.

Physicists and engineers who find variational methods evasive at times will find this book particularly helpful. Synge, Bulletin of the American Mathematical Society. The Best Books of Check out the top books of the year on our page Best Books of Looking for beautiful books?

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Calculus Of Variations – With Applications To Physics And Engineering

Table of contents Preface Chapter 1. Piecewise continuity, piecewise differentiability 2. Partial and total differentiation 3.

Differentiation of an integral 4. Integration by parts 5. Euler’s theorem on homogeneous functions 6. Method of undetermined lagrange multipliers 7.

The line integral 8. Formula for surface area Taylor’s theorem for functions of several variables The surface integral Green’s theorem two dimensions Weinatock theorem three dimensions Chapter 3. A basic lemma 2. Statement and formulation of several problems 3. The Euler-Lagrange equation 4. Calxulus integrals of the Euler-Lagrange equation.

Calculus Of Variations First Edition

A degenerate case 5. Minimum surface of revolution 8. Several dependent variables 9. Undetermined end points Brachistochrone from a given curve to a fixed point Chapter 4. The simple isoperimetric problem 2. Problem of the maximum enclosed area 4.

Shape of a hanging rope. Restrictions imposed through finite or differential equations Chapter 5. Law of refraction Snell’s law 2. Fermat’s principle and the calculus of variations Chapter 6. Dynamics of Particles 1. Potential and kinetic energies. Lagrange equations of motion 3. Hamilton equations of motion. The Hamilton-Jacobi differential equation 6.


Principle of least action 7. xalculus

The extended Hamilton’s principle Chapter 7. The Vibrating String 1. Extremization of a double integral 2. The vibrating string 3. Eigenvalue-eigenfunction problem for the vibrating string 4.

Weijstock expansion of arbitrary functions. Minimum characterization of the eigenvalue-eigenfunction problem 5. General solution of the vibrating-string equation 6. Approximation of the vibrating-string eigenvalues and eigenfunctions Ritz method 7.

Remarks on the distinction between imposed and free end-point conditions Chapter 8. Isoperimetric problem leading to a Sturm-Liouville system 2. Transformation of a Sturm-Liouville system 3. Laguerre polynomials, Bessel functions Chapter 9.

Calculus of Variations : Robert Weinstock :

The Vibrating Membrane 1. Extremization of a multiple integral 2. Change of independent variables. Transformation of the laplacian 3. The vibrating membrane 4. Eigenvalue-eigenfunction problem for the membrane 5. Membrane with boundary held elastically. The free membrane 6.

Orthogonality of the eigenfunctions. Expansion of arbitrary variatjons 7. General solution of the membrane equation 8. The rectangular membrane of uniform density 9.

The weinstofk characterization of the membrane eigenvalues Consequences of the minimum characterization of the membrane eigenvalues vriations The maximum-minimum characterization of the membrane eigenvalues The asymptotic distribution of the membrane eigenvalues Approximation of the membrane eigenvalues Chapter Theory of Elasticity 1. Stress and strain 2. General equations of motion and equilibrium 3. General aspects of the approach to certain dynamical problems 4.

Bending of a cylindrical bar by couples 5. Transverse vibrations of a bar 6. The eigenvalue-eigenfunction problem for the vibrating bar 7.