Chapter 1 First\|Order Equations 1.1 The Cauchy Problem for Quasilinear Equations 1.2 Weak Solutions for Quasilinear Equations 1.3 General Nonlinear Equations 1.4 Concluding remarks on First-Order Equations Chapter 2 Principles for Higher\|Order Equations 2.1 Trhe Cauchy Problem 2.2 Second-Order Equations in Two Varibales 2.3 Linear Equations and Generalized Solutions Chapter 3 The Wave Equation 3.1 The One-Dimensional Wave Equation 3.2 Higher Dimensions 3.3 Energy Methods 3.4 Lower-order Terms Chapter 4 The Laplace Equation 4.1 Introudiction to the Laplace Equation 4.2 Potential Theory and Green's Functions 4.3 General Existence Theory 4.4 Eigenvalues of the Laplacian Chapter 5 The Heat Equation 5.1 The Heat Equation in a Bounded Domain 5.2 The Pure Initial Value Problem 5.3 Regularity and Similarity Chapter 6 Linear Functional Analysis 6.1 Function Spaces and Linear Operators 6.2 Application to the Dirichlet Problem 6.3 Duality and Compactness 6.4 Sobolev Imbedding Theorems 6.5 Generalizations and Refinements Chapter 7 Differential Calculus Methods …… Chapter 8 Linear Elliptic Theory Chapter 9 Two Additional Methods Chapter10 Systems of Conservation Laws Chapter11 Linear and Nonlinear Diffusion Chapter12 Linear and Nonlinear Waves Chapter13 Nonlinear Elliptic Equations |
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