Une pure merveille !
Un roman d'une grande beauté, drôle, fin, extrêmement lumineux sur des sujets difficiles : la perte de
l'être aimé, la dureté de la vie et la tristesse qu'on barricade parfois... Elise franco-japonaise,
orpheline de sa maman veut poser LA question à son père et elle en trouvera le courage au fil des pages,
grâce au retour de sa grand-mère du japon, de sa rencontre avec son extravagante amie Stella..
Ensemble il ne diront plus Sayonara mais Mata Ne !
The series of texts on classical theoretical physics is based on the highly successful series of courses given by Walter Greiner at the Johann Wolfgang...
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Résumé
The series of texts on classical theoretical physics is based on the highly successful series of courses given by Walter Greiner at the Johann Wolfgang Goethe University in Frankfurt am Main, Germany. Intended for advanced undergraduate and beginning graduate students, the volumes in the series provide not only a complete survey of classical theoretical physics but also an enormous number of worked examples and problems to show students clearly how to apply the abstract principles to realistic problems. Classical Mechanics, Point Particles and Relativity begins with an introduction to vector calculus, covering such topics as: Vector algebra: component representations, scalar products, and vector products; Differentiation and integration of vectors; Line integrals, surface integrals, volume integrals, and the theorems of Gauss and Stokes. The discussion of Newtonian mechanics includes: Newton's axioms and the basic concepts of mechanics; General linear motion, free fall, and friction; The harmonic oscillator and the damped harmonic oscillator; Central field problems, planetary motions, the Solar System, and the place of Earth in the universe; Mathematical interludes on series expansions, Euler's formulas, and differential equations. The text concludes with a discussion of special relativity, including: The principle of relativity and the Michelson-Morley experiment; The Lorentz transformation and the addition of velocities; Mechanics in Minkowski space; Applications of the special theory of relativity.
Sommaire
VECTOR CALCULUS
Introduction and Basic Definition
The Scalar Product
Component Representation of a Vector
The Vector Product (Axial Vector)
The Triple Scalar Product
Application of Vector Calculus
Differentiation and Integration of Vectors
The Moving Trihedral (Accompanying Dreibein) the Frenet Formulas
Surfaces in Space
Coordinate Frames
Vector Differential Operations
Determination of Line Integrals
The Integral Laws of Gauss and Stokes
Calculation of Surface Integrals
Volume (Space) Integrals
NEWTONIAN MECHANICS
Newton's Axioms
Basic Concepts of Mechanics
The general Linear Motion
The Free Fall
Friction
The Harmonic Oscillator
Mathematical Interlude - Series Expansion, Euler's Formulas
The Damped Harmonic Oscillator
The pendulum
Mathematical Interlude: Differential Equations
Planetary Motions
Special Problems in Central Fields
The Earth and our Solar System
THEORY OF RELATIVITY
Relativity Principle and Michelson - Morley Experiment
The Lorentz Transformation
Properties of the Lorentz transformation
Addition Theorem of the Velocities
The basic Quantities of Mechanics in Minkowski Space