| Preface to the Fourth Edition | p. xv |
| Preface to the Third Edition | p. xix |
| Introduction | p. 1 |
| Brief Historical Comments | p. 1 |
| Basic Concepts and Definitions | p. 12 |
| Mathematical Problems | p. 15 |
| Linear Operators | p. 16 |
| Superposition Principle | p. 20 |
| Exercises | p. 22 |
| First-Order, Quasi-Linear Equations and Method of Characteristics | p. 27 |
| Introduction | p. 27 |
| Classification of First-Order Equations | p. 27 |
| Construction of a First-Order Equation | p. 29 |
| Geometrical Interpretation of a First-Order Equation | p. 33 |
| Method of Characteristics and General Solutions | p. 35 |
| Canonical Forms of First-Order Linear Equations | p. 49 |
| Method of Separation of Variables | p. 51 |
| Exercises | p. 55 |
| Mathematical Models | p. 63 |
| Classical Equations | p. 63 |
| The Vibrating String | p. 65 |
| The Vibrating Membrane | p. 67 |
| Waves in an Elastic Medium | p. 69 |
| Conduction of Heat in Solids | p. 75 |
| The Gravitational Potential | p. 76 |
| Conservation Laws and The Burgers Equation | p. 79 |
| The Schrodinger and the Korteweg-de Vries Equations | p. 81 |
| Exercises | p. 83 |
| Classification of Second-Order Linear Equations | p. 91 |
| Second-Order Equations in Two Independent Variables | p. 91 |
| Canonical Forms | p. 93 |
| Equations with Constant Coefficients | p. 99 |
| General Solutions | p. 107 |
| Summary and Further Simplification | p. 111 |
| Exercises | p. 113 |
| The Cauchy Problem and Wave Equations | p. 117 |
| The Cauchy Problem | p. 117 |
| The Cauchy-Kowalewskaya Theorem | p. 120 |
| Homogeneous Wave Equations | p. 121 |
| Initial Boundary-Value Problems | p. 130 |
| Equations with Nonhomogeneous Boundary Conditions | p. 134 |
| Vibration of Finite String with Fixed Ends | p. 136 |
| Nonhomogeneous Wave Equations | p. 139 |
| The Riemann Method | p. 142 |
| Solution of the Goursat Problem | p. 149 |
| Spherical Wave Equation | p. 153 |
| Cylindrical Wave Equation | p. 155 |
| Exercises | p. 158 |
| Fourier Series and Integrals with Applications | p. 167 |
| Introduction | p. 167 |
| Piecewise Continuous Functions and Periodic Functions | p. 168 |
| Systems of Orthogonal Functions | p. 170 |
| Fourier Series | p. 171 |
| Convergence of Fourier Series | p. 173 |
| Examples and Applications of Fourier Series | p. 177 |
| Examples and Applications of Cosine and Sine Fourier Series | p. 183 |
| Complex Fourier Series | p. 194 |
| Fourier Series on an Arbitrary Interval | p. 196 |
| The Riemann-Lebesgue Lemma and Pointwise Convergence Theorem | p. 201 |
| Uniform Convergence, Differentiation, and Integration | p. 208 |
| Double Fourier Series | p. 212 |
| Fourier Integrals | p. 214 |
| Exercises | p. 220 |
| Method of Separation of Variables | p. 231 |
| Introduction | p. 231 |
| Separation of Variables | p. 232 |
| The Vibrating String Problem | p. 235 |
| Existence and Uniqueness of Solution of the Vibrating String Problem | p. 243 |
| The Heat Conduction Problem | p. 248 |
| Existence and Uniqueness of Solution of the Heat Conduction Problem | p. 251 |
| The Laplace and Beam Equations | p. 254 |
| Nonhomogeneous Problems | p. 258 |
| Exercises | p. 265 |
| Eigenvalue Problems and Special Functions | p. 273 |
| Sturm-Liouville Systems | p. 273 |
| Eigenvalues and Eigenfunctions | p. 277 |
| Eigenfunction Expansions | p. 283 |
| Convergence in the Mean | p. 284 |
| Completeness and Parseval's Equality | p. 286 |
| Bessel's Equation and Bessel's Function | p. 289 |
| Adjoint Forms and Lagrange Identity | p. 295 |
| Singular Sturm-Liouville Systems | p. 297 |
| Legendre's Equation and Legendre's Function | p. 302 |
| Boundary-Value Problems Involving Ordinary Differential Equations | p. 308 |
| Green's Functions for Ordinary Differential Equations | p. 310 |
| Construction of Green's Functions | p. 315 |
| The Schrodinger Equation and Linear Harmonic Oscillator | p. 317 |
| Exercises | p. 321 |
| Boundary-Value Problems and Applications | p. 329 |
| Boundary-Value Problems | p. 329 |
| Maximum and Minimum Principles | p. 332 |
| Uniqueness and Continuity Theorems | p. 333 |
| Dirichlet Problem for a Circle | p. 334 |
| Dirichlet Problem for a Circular Annulus | p. 340 |
| Neumann Problem for a Circle | p. 341 |
| Dirichlet Problem for a Rectangle | p. 343 |
| Dirichlet Problem Involving the Poisson Equation | p. 346 |
| The Neumann Problem for a Rectangle | p. 348 |
| Exercises | p. 351 |
| Higher-Dimensional Boundary-Value Problems | p. 361 |
| Introduction | p. 361 |
| Dirichlet Problem for a Cube | p. 361 |
| Dirichlet Problem for a Cylinder | p. 363 |
| Dirichlet Problem for a Sphere | p. 367 |
| Three-Dimensional Wave and Heat Equations | p. 372 |
| Vibrating Membrane | p. 372 |
| Heat Flow in a Rectangular Plate | p. 375 |
| Waves in Three Dimensions | p. 379 |
| Heat Conduction in a Rectangular Volume | p. 381 |
| The Schrodinger Equation and the Hydrogen Atom | p. 382 |
| Method of Eigenfunctions and Vibration of Membrane | p. 392 |
| Time-Dependent Boundary-Value Problems | p. 395 |
| Exercises | p. 398 |
| Green's Functions and Boundary-Value Problems | p. 407 |
| Introduction | p. 407 |
| The Dirac Delta Function | p. 409 |
| Properties of Green's Functions | p. 412 |
| Method of Green's Functions | p. 414 |
| Dirichlet's Problem for the Laplace Operator | p. 416 |
| Dirichlet's Problem for the Helmholtz Operator | p. 418 |
| Method of Images | p. 420 |
| Method of Eigenfunctions | p. 423 |
| Higher-Dimensional Problems | p. 425 |
| Neumann Problem | p. 430 |
| Exercises | p. 433 |
| Integral Transform Methods with Applications | p. 439 |
| Introduction | p. 439 |
| Fourier Transforms | p. 440 |
| Properties of Fourier Transforms | p. 444 |
| Convolution Theorem of the Fourier Transform | p. 448 |
| The Fourier Transforms of Step and Impulse Functions | p. 453 |
| Fourier Sine and Cosine Transforms | p. 456 |
| Asymptotic Approximation of Integrals by Stationary Phase Method | p. 458 |
| Laplace Transforms | p. 460 |
| Properties of Laplace Transforms | p. 463 |
| Convolution Theorem of the Laplace Transform | p. 467 |
| Laplace Transforms of the Heaviside and Dirac Delta Functions | p. 470 |
| Hankel Transforms | p. 488 |
| Properties of Hankel Transforms and Applications | p. 491 |
| Mellin Transforms and their Operational Properties | p. 495 |
| Finite Fourier Transforms and Applications | p. 499 |
| Finite Hankel Transforms and Applications | p. 504 |
| Solution of Fractional Partial Differential Equations | p. 510 |
| Exercises | p. 521 |
| Nonlinear Partial Differential Equations with Applications | p. 535 |
| Introduction | p. 535 |
| One-Dimensional Wave Equation and Method of Characteristics | p. 536 |
| Linear Dispersive Waves | p. 540 |
| Nonlinear Dispersive Waves and Whitham's Equations | p. 545 |
| Nonlinear Instability | p. 548 |
| The Traffic Flow Model | p. 549 |
| Flood Waves in Rivers | p. 552 |
| Riemann's Simple Waves of Finite Amplitude | p. 553 |
| Discontinuous Solutions and Shock Waves | p. 561 |
| Structure of Shock Waves and Burgers' Equation | p. 563 |
| The Korteweg-de Vries Equation and Solitons | p. 573 |
| The Nonlinear Schrodinger Equation and Solitary Waves | p. 581 |
| The Lax Pair and the Zakharov and Shabat Scheme | p. 590 |
| Exercises | p. 595 |
| Numerical and Approximation Methods | p. 601 |
| Introduction | p. 601 |
| Finite Difference Approximations, Convergence, and Stability | p. 602 |
| Lax-Wendroff Explicit Method | p. 605 |
| Explicit Finite Difference Methods | p. 608 |
| Implicit Finite Difference Methods | p. 624 |
| Variational Methods and the Euler-Lagrange Equations | p. 629 |
| The Rayleigh-Ritz Approximation Method | p. 647 |
| The Galerkin Approximation Method | p. 655 |
| The Kantorovich Method | p. 659 |
| The Finite Element Method | p. 663 |
| Exercises | p. 668 |
| Tables of Integral Transforms | p. 681 |
| Fourier Transforms | p. 681 |
| Fourier Sine Transforms | p. 683 |
| Fourier Cosine Transforms | p. 685 |
| Laplace Transforms | p. 687 |
| Hankel Transforms | p. 691 |
| Finite Hankel Transforms | p. 695 |
| Answers and Hints to Selected Exercises | p. 697 |
| Exercises | p. 697 |
| Exercises | p. 698 |
| Exercises | p. 704 |
| Exercises | p. 707 |
| Exercises | p. 712 |
| Exercises | p. 715 |
| Exercises | p. 724 |
| Exercises | p. 726 |
| Exercises | p. 727 |
| Exercises | p. 731 |
| Exercises | p. 739 |
| Exercises | p. 740 |
| Exercises | p. 745 |
| Some Special Functions and Their Properties | p. 749 |
| Gamma, Beta, Error, and Airy Functions | p. 749 |
| Hermite Polynomials and Weber-Hermite Functions | p. 757 |
| Bibliography | p. 761 |
| Index | p. 771 |
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