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200 10$aHeat conduction$b[electronic resource] /$fDavid W. Hahn, M. Necati O?zis?ik
205   $a3rd ed.
210   $aHoboken, N.J. $cWiley$d2012
215   $a1 online resource (746 p.)
300   $aRev. ed. of: Heat conduction / M. Necati O?zisik. 2nd ed. c1993.
311   $a0-470-90293-0 
320   $aIncludes bibliographical references and index.
327   $aHeat Conduction; Contents; Preface; Preface to Second Edition; Chapter 1 Heat Conduction Fundamentals; 1-1 The Heat Flux; 1-2 Thermal Conductivity; 1-3 Differential Equation of Heat Conduction; 1-4 Fourier's Law and the Heat Equation in Cylindrical and Spherical Coordinate Systems; 1-5 General Boundary Conditions and Initial Condition for the Heat Equation; 1-6 Nondimensional Analysis of the Heat Conduction Equation; 1-7 Heat Conduction Equation for Anisotropic Medium; 1-8 Lumped and Partially Lumped Formulation; References; Problems
327   $aChapter 2 Orthogonal Functions, Boundary Value Problems, and the Fourier Series2-1 Orthogonal Functions; 2-2 Boundary Value Problems; 2-3 The Fourier Series; 2-4 Computation of Eigenvalues; 2-5 Fourier Integrals; References; Problems; Chapter 3 Separation of Variables in the Rectangular Coordinate System; 3-1 Basic Concepts in the Separation of Variables Method; 3-2 Generalization to Multidimensional Problems; 3-3 Solution of Multidimensional Homogenous Problems; 3-4 Multidimensional Nonhomogeneous Problems: Method of Superposition; 3-5 Product Solution; 3-6 Capstone Problem; References
327   $aProblemsChapter 4 Separation of Variables in the Cylindrical Coordinate System; 4-1 Separation of Heat Conduction Equation in the Cylindrical Coordinate System; 4-2 Solution of Steady-State Problems; 4-3 Solution of Transient Problems; 4-4 Capstone Problem; References; Problems; Chapter 5 Separation of Variables in the Spherical Coordinate System; 5-1 Separation of Heat Conduction Equation in the Spherical Coordinate System; 5-2 Solution of Steady-State Problems; 5-3 Solution of Transient Problems; 5-4 Capstone Problem; References; Problems; Notes
327   $aChapter 6 Solution of the Heat Equation for Semi-Infinite and Infinite Domains6-1 One-Dimensional Homogeneous Problems in a Semi-Infinite Medium for the Cartesian Coordinate System; 6-2 Multidimensional Homogeneous Problems in a Semi-Infinite Medium for the Cartesian Coordinate System; 6-3 One-Dimensional Homogeneous Problems in An Infinite Medium for the Cartesian Coordinate System; 6-4 One-Dimensional homogeneous Problems in a Semi-Infinite Medium for the Cylindrical Coordinate System; 6-5 Two-Dimensional Homogeneous Problems in a Semi-Infinite Medium for the Cylindrical Coordinate System
327   $a6-6 One-Dimensional Homogeneous Problems in a Semi-Infinite Medium for the Spherical Coordinate SystemReferences; Problems; Chapter 7 Use of Duhamel's Theorem; 7-1 Development of Duhamel's Theorem for Continuous Time-Dependent Boundary Conditions; 7-2 Treatment of Discontinuities; 7-3 General Statement of Duhamel's Theorem; 7-4 Applications of Duhamel's Theorem; 7-5 Applications of Duhamel's Theorem for Internal Energy Generation; References; Problems; Chapter 8 Use of Green's Function for Solution of Heat Conduction Problems
327   $a8-1 Green's Function Approach for Solving Nonhomogeneous Transient Heat Conduction
330   $a"This book supplies the long awaited revision of the bestseller on heat conduction, replacing some of the coverage of numerical methods with content on micro- and nano-scale heat transfer. Extensive problems, cases, and examples have been thoroughly updated, and a solutions manual is available"--$cProvided by publisher.
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700   $aHahn$b David W.$f1964-$0478258
701   $aO?z?s??k$b M. Necati$0748174
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