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ISBN: 9781139136860 9781107022584 9781107055551 1107055555 9781299706057 1299706053 1139136860 9781107059047 1107059046 1107022584 1107065119 1316090671 1107057787 1107255511 1107056667 Year: 2013 Publisher: Cambridge Cambridge University Press
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There is a resurgence of applications in which the calculus of variations has direct relevance. In addition to application to solid mechanics and dynamics, it is now being applied in a variety of numerical methods, numerical grid generation, modern physics, various optimization settings and fluid dynamics. Many applications, such as nonlinear optimal control theory applied to continuous systems, have only recently become tractable computationally, with the advent of advanced algorithms and large computer systems. This book reflects the strong connection between calculus of variations and the applications for which variational methods form the fundamental foundation. The mathematical fundamentals of calculus of variations (at least those necessary to pursue applications) is rather compact and is contained in a single chapter of the book. The majority of the text consists of applications of variational calculus for a variety of fields.
Variational principles. --- Science --- Engineering --- Construction --- Industrial arts --- Technology --- Scientific method --- Logic, Symbolic and mathematical --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations --- Methodology.
ISBN: 0486637735 Year: 1979 Publisher: New York (N.Y.): Dover
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Variational principles --- Dynamics --- Quantum theory --- Quantum dynamics --- Quantum mechanics --- Quantum physics --- Physics --- Mechanics --- Thermodynamics --- Dynamical systems --- Kinetics --- Mathematics --- Mechanics, Analytic --- Force and energy --- Statics --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations
ISBN: 1282034731 9786612034732 0080926428 0127284508 9780080926421 9781282034730 9780127284507 Year: 1989 Publisher: Boston : Academic Press,
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This book provides a comprehensive survey of analytic and approximate solutions of problems of applied mechanics, with particular emphasis on nonconservative phenomena. Include
Mechanics, Analytic. --- Variational principles. --- Dynamics of a particle. --- Dynamics of a particle --- Dynamics of particles --- Particles --- Dynamics --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations --- Analytical mechanics --- Kinetics
ISBN: 0821845292 9780821845295 Year: 1989 Volume: 77 Publisher: Providence (R.I.): American Mathematical Society
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Nonlinear operators --- Variational principles --- Differential equations, Partial --- Opérateurs non linéaires --- Principes variationnels --- Equations aux dérivées partielles --- 51 --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations --- Operators, Nonlinear --- Operator theory --- Partial differential equations --- Mathematics --- 51 Mathematics --- Opérateurs non linéaires --- Equations aux dérivées partielles
ISBN: 0471868493 9780471868491 Year: 1982 Publisher: New York (N.Y.): Wiley
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Boundary value problems --- Variational principles --- Problèmes aux limites --- Principes variationnels --- 517.97 --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations --- Boundary conditions (Differential equations) --- Differential equations --- Functions of complex variables --- Mathematical physics --- Initial value problems --- Calculus of variations. Mathematical theory of control --- Boundary value problems. --- Variational principles. --- 517.97 Calculus of variations. Mathematical theory of control --- Problèmes aux limites
ISBN: 0195068300 9780195068306 Year: 1992 Publisher: New York (N.Y.): Oxford university press
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Finite element method --- Mechanics, Applied --- Variational principles. --- Mathematics. --- 51-72 --- -Variational principles --- #KVIV:BB --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations --- Applied mechanics --- Engineering, Mechanical --- Engineering mathematics --- FEA (Numerical analysis) --- FEM (Numerical analysis) --- Finite element analysis --- Numerical analysis --- Isogeometric analysis --- Mathematics--?-72 --- Mathematics --- Finite element method. --- 51-72 Mathematics--?-72 --- Variational principles --- Mathématiques --- Mécanique --- Mechanics, Applied - Mathematics. --- Methode variationnelle
ISBN: 0486650677 9780802017437 9780486650678 Year: 1970 Volume: 4 Publisher: New York Dover Publications
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Mechanics, Analytic --- Variational principles --- 531 --- 531 General mechanics. Mechanics of solid and rigid bodies --- General mechanics. Mechanics of solid and rigid bodies --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations --- Analytical mechanics --- Kinetics --- Variational principles. --- Mécanique analytique --- Principes variationnels --- Mechanics, Analytic. --- Mécanique analytique --- Mécanique analytique. --- Principes variationnels.
Book
ISBN: 1108299547 1108297943 1108299865 1139021028 1108301789 1108300189 1108300502 9781108301787 9781139021029 9781108300506 0521869021 9780521869027 Year: 2017 Publisher: Cambridge Cambridge University Press
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The principle of least action originates in the idea that, if nature has a purpose, it should follow a minimum or critical path. This simple principle, and its variants and generalizations, applies to optics, mechanics, electromagnetism, relativity, and quantum mechanics, and provides an essential guide to understanding the beauty of physics. This unique text provides an accessible introduction to the action principle across these various fields of physics, and examines its history and fundamental role in science. It includes - with varying levels of mathematical sophistication - explanations from historical sources, discussion of classic papers, and original worked examples. The result is a story that is understandable to those with a modest mathematical background, as well as to researchers and students in physics and the history of physics.
Least action. --- Variational principles. --- Mechanics. --- Lagrange equations. --- Hamilton-Jacobi equations. --- Equations, Hamilton-Jacobi --- Equations, Jacobi-Hamilton --- Jacobi-Hamilton equations --- Calculus of variations --- Differential equations, Partial --- Hamiltonian systems --- Mechanics --- D'Alembert equation --- Equations, Euler-Lagrange --- Equations, Lagrange --- Euler-Lagrange equations --- Lagrangian equations --- Differential equations --- Equations of motion --- Classical mechanics --- Newtonian mechanics --- Physics --- Dynamics --- Quantum theory --- Extremum principles --- Minimal principles --- Variation principles --- Variational principles
ISSN: 00659266 ISBN: 0821827154 Year: 2001 Publisher: Providence (R.I.): American Mathematical Society
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Differential equations --- Classical mechanics. Field theory --- Differentiable dynamical systems --- Lagrange equations --- Variational principles --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations --- D'Alembert equation --- Equations, Euler-Lagrange --- Equations, Lagrange --- Euler-Lagrange equations --- Lagrangian equations --- Equations of motion --- Differential dynamical systems --- Dynamical systems, Differentiable --- Dynamics, Differentiable --- Global analysis (Mathematics) --- Topological dynamics --- Lagrange equations. --- Lagrange, Équations de --- Differentiable dynamical systems. --- Systèmes dynamiques --- Variational principles. --- Principes variationnels --- Lagrange, Équations de. --- Systèmes dynamiques. --- Principes variationnels.
Book
ISBN: 0201100967 9780201100969 Year: 1981 Volume: no. 1 Publisher: London
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Mathematical physics --- Differential geometry. Global analysis --- Gauge fields (Physics) --- Variational principles --- Champs de jauge (Physique) --- Principes variationnels --- 514.8 --- Extremum principles --- Minimal principles --- Variation principles --- Calculus of variations --- Fields, Gauge (Physics) --- Gage fields (Physics) --- Gauge theories (Physics) --- Field theory (Physics) --- Group theory --- Symmetry (Physics) --- Geometric study of objects of mechanics and physics --- Variational principles. --- Gauge fields (Physics). --- 514.8 Geometric study of objects of mechanics and physics
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