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951   $aSIBA - SISTEMA BIBLIOTECARIO DI ATENEO$bSI2022798       1J                   20221220DDT n. 6 del 12/1/2023                                                          
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200 10$aModern Mathematics for the Engineer
205   $a1st ed.
210   $aNewburyport $cDover Publications$d2013
215   $a1 online resource (1003 p.)
225 1 $aDover Books on Engineering
300   $aDescription based upon print version of record.
311 08$a0-486-49746-1 
327   $aCover; Halftitle; Title Page; Copyright Page; The Authors; Foreword to the 1956 Edition; Preface to the 1956 Edition; Contents; Introduction; PART 1. MATHEMATICAL MODELS; 1 Linear and Nonlinear Oscillations BY SOLOMON LEFSCHETZ; 1.1 Introduction; 1.2 Harmonic Oscillators; 1.3 Damped Oscillations; 1.4 Forced Oscillations; 1.5 Linear and Nonlinear Systems; 1.6 Certain Nonlinear Systems; 1.7 Nonlinear Oscillations in Conservative Systems; 1.8 Nonlinear Forced Oscillations; 1.9 Multivibrator Circuits; 1.10 Mathematical Treatment of Nonlinear Problems; 1.11 Methods of Approximation
327   $a1.12 Duffing's Method1.13 Poincare?'s Perturbation Method; 2 Equilibrium Analysis: The Stability Theory and Liapunov BY RICHARD BELLMAN; 2.1 Introduction; 2.2 The Stability Theory of Poincare? and Liapunov; 2.3 Stability Theory of Linear Equations; 2.4 Differential-difference Equations; 2.5 The Heat Equation; 3 Exterior Ballistics BY JOHN W. GREEN; 3.1 Introduction; 3.2 Selection of Coordinate Systems; 3.3 Aerodynamic Forces on a Projectile; 3.4 The Equations of Motion; 3.5 Ballistic and Firing Tables; 3.6 Corrections for Small Effects; 3.7 Bombing from Airplanes
327   $a3.8 Effects of Aerodynamic Forces Other than Drag3.9 Conclusion and References; 4 Elements of the Calculus of Variations BY MAGNUS R. HESTENES; 4.1 Introduction; 4.2 Some Elementary Variational Problems; 4.3 General Statements of Problems;  Necessary Conditions for a Minimum; 4.4 Derivation of the Euler Equations; 4.5 Special Cases; 4.6 Integrands of the Form f(x, y); 4.7 Hamilton's Principle; 4.8 Hamiltonians; 4.9 Isoperimetric Problems; 4.10 Variable End-point Problems; 4.11 Minima of Functions of Integrals; 4.12 Problem of Bolza; 4.13 Multiple-integral Problems
327   $a5 Hyperbolic Partial Differential Equations and Applications BY RICHARD COURANT5.1 Introduction; 5.2 Relation between Partial Differential Equations and Reality; 5.3 Statistical Processes and Partial Differential Equations; 5.4 Classification of Linear Partial Differential Equations;  Plane Waves; 5.5 Initial-value Problem for the Wave Equation; 5.6 Nonlinear Hyperbolic Equations; 5.7 Finite-difference Methods; 6 Boundary-value Problems in Elliptic Partial Differential Equations BY MENAHEM M. SCHIFFER; 6.1 What Is a Properly Posed Problem in Partial Differential Equations?
327   $a6.2 Theory of Heat Conduction the Three Main Boundary-value Problems; 6.3 Fundamental Singularities and Green's Functions; 6.4 Maximum Principle, Kernel Function, and Dirichlet Integral; 6.5 Illustrations from Fluid Dynamics and Electrostatics; 6.6 Variation of the Green's Functions with the Domain; 6.7 Variation of the Green's Functions with the Coefficients of the Differential Equation; 7 The Elastostatic Boundary-value Problems BY IVAN S. SOKOLNIKOFF; Formulation of Problems; 7.1 Introduction; 7.2 Two Basic Types of Problems; 7.3 Characterization of Displacements;  Strain
327   $a7.4 Characterization of the State of Stress
330   $a This volume and its successor were conceived to advance the level of mathematical sophistication in the engineering community. The books particularly focus on material relevant to solving the kinds of mathematical problems regularly confronted by engineers. Suitable as a text for advanced undergraduate and graduate courses as well as a reference for professionals, Volume One's three-part treatment covers mathematical models, probabilistic problems, and computational considerations. Contributions include chapters on linear and nonlinear oscillations by Solomon Lefschetz, on hyperbolic partial 
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606   $aMathematical physics
606   $aEngineering mathematics
606   $aCivil & Environmental Engineering$2HILCC
606   $aEngineering & Applied Sciences$2HILCC
606   $aOperations Research$2HILCC
615  0$aMathematics.
615  0$aMathematical physics.
615  0$aEngineering mathematics.
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615  7$aEngineering & Applied Sciences
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