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Classical Mechanics Joel A. Shapiro April 21, 2003 i Copyright C 1994, 1997 by Joel A. Shapiro All rights reserved. No part of this publication may be reproduced, stored in a retrieval system, or transmitted in any form or by any means, electronic, mechanical, photocopying, or otherwise, without the prior written permission of the author. This is a preliminary version of the book, not to be considered a fully published edition. While some of the material, particularly the first four chapters, is close to readiness for a first edition, chapters 6 and 7 need more work, and chapter 8 is incomplete. The appendices are random selections not yet reorganized. There are also as yet few exercises for the later chapters. The first edition will have an adequate set of exercises for each chapter. The author welcomes corrections, comments, and criticism. ii Contents 1 Particle Kinematics 1 1.1 Introduction 1 1.2 SingleParticleKinematics 4 1.2.1 Motioninconfigurationspace 4 1.2.2 ConservedQuantities 6 1.3 SystemsofParticles 9 1.3.1 Externalandinternalforces 10 1.3.2 Constraints 14 1.3.3 Generalized Coordinates for Unconstrained Sys- tems 17 1.3.4 Kineticenergyingeneralizedcoordinates 19 1.4 PhaseSpace 21 1.4.1 DynamicalSystems 22 1.4.2 PhaseSpaceFlows 27 2 Lagrange’s and Hamilton’s Equations 37 2.1 LagrangianMechanics 37 2.1.1 Derivationforunconstrainedsystems 38 2.1.2 LagrangianforConstrainedSystems 41 2.1.3 Hamilton’sPrinciple 46 2.1.4 Examplesoffunctionalvariation 48 2.1.5 ConservedQuantities 50 2.1.6 Hamilton’sEquations 53 2.1.7 Velocity-dependentforces 55 3TwoBodyCentralForces 65 3.1 Reductiontoaonedimensionalproblem 65 iii iv CONTENTS 3.1.1 Reductiontoaone-bodyproblem 66 3.1.2 Reductiontoonedimension 67 3.2 Integratingthemotion 69 3.2.1 TheKeplerproblem 70 3.2.2 NearlyCircularOrbits 74 3.3 TheLaplace-Runge-LenzVector 77 3.4 Thevirialtheorem 78 3.5 RutherfordScattering 79 4 Rigid Body Motion 85 4.1 Configurationspaceforarigidbody 85 4.1.1 Orthogonal Transformations . . 87 4.1.2 Groups 91 4.2 Kinematicsinarotatingcoordinatesystem 94 4.3 Themomentofinertiatensor 98 4.3.1 Motionaboutafixedpoint 98 4.3.2 MoreGeneralMotion 100 4.4 Dynamics 107 4.4.1 Euler’sEquations 107 4.4.2 Eulerangles 113 4.4.3 Thesymmetrictop 117 5 Small Oscillations 127 5.1 Small oscillations about stable equilibrium 127 5.1.1 MolecularVibrations 130 5.1.2 AnAlternativeApproach 137 5.2 Otherinteractions 137 5.3 Stringdynamics 138 5.4 Fieldtheory 143 6 Hamilton’s Equations 147 6.1 Legendretransforms 147 6.2 Variationsonphasecurves 152 6.3 Canonicaltransformations 153 6.4 PoissonBrackets 155 6.5 HigherDifferentialForms 160 6.6 Thenaturalsymplectic2-form 169 CONTENTS v 6.6.1 GeneratingFunctions 172 6.7 Hamilton–JacobiTheory 181 6.8 Action-AngleVariables 185 7 Perturbation Theory 189 7.1 Integrablesystems 189 7.2 CanonicalPerturbationTheory 194 7.2.1 TimeDependentPerturbationTheory 196 7.3 AdiabaticInvariants 198 7.3.1 Introduction 198 7.3.2 Foratime-independentHamiltonian 198 7.3.3 Slow time variation in H(q, p, t) 200 7.3.4 SystemswithManyDegreesofFreedom 206 7.3.5 FormalPerturbativeTreatment 209 7.4 RapidlyVaryingPerturbations 211 7.5 Newapproach 216 8 Field Theory 219 8.1 Noether’sTheorem 225 A  ijk and cross products 229 A.1 VectorOperations 229 A.1.1 δ ij and  ijk 229 B The gradient operator 233 C Gradient in Spherical Coordinates 237 vi CONTENTS Chapter 1 Particle Kinematics 1.1 Introduction Classical mechanics, narrowly defined, is the investigation of the motion of systems of particles in Euclidean three-dimensional space, under the influence of specified force laws, with the motion’s evolution determined by Newton’s second law, a second order differential equation. That is, given certain laws determining physical forces, and some boundary conditions on the positions of the particles at some particular times, the problem is to determine the positions of all the particles at all times. We will be discussing motions under specific fundamental laws of great physical importance, such as Coulomb’s law for the electrostatic force between charged particles. We will also discuss laws which are less fundamental, because the motion under them can be solved explicitly, allowing them to serve as very useful models for approximations to more complicated physical situations, or as a testbed for examining concepts in an explicitly evaluatable situation. Techniques suitable for broad classes of force laws will also be developed. The formalism of Newtonian classical mechanics, together with in- vestigations into the appropriate force laws, provided the basic frame- work for physics from the time of Newton until the beginning of this century. The systems considered had a wide range of complexity. One might consider a single particle on which the Earth’s gravity acts. But one could also consider systems as the limit of an infinite number of 1 2 CHAPTER 1. PARTICLE KINEMATICS very small particles, with displacements smoothly varying in space, which gives rise to the continuum limit. One example of this is the consideration of transverse waves on a stretched string, in which every point on the string has an associated degree of freedom, its transverse displacement. The scope of classical mechanics was broadened in the 19th century, in order to consider electromagnetism. Here the degrees of freedom were not just the positions in space of charged particles, but also other quantities, distributed throughout space, such as the the electric field at each point. This expansion in the type of degrees of freedom has continued, and now in fundamental physics one considers many degrees of freedom which correspond to no spatial motion, but one can still discuss the classical mechanics of such systems. As a fundamental framework for physics, classical mechanics gave way on several fronts to more sophisticated concepts in the early 1900’s. Most dramatically, quantum mechanics has changed our focus from spe- cific solutions for the dynamical degrees of freedom as a function of time to the wave function, which determines the probabilities that a system have particular values of these degrees of freedom. Special relativity not only produced a variation of the Galilean invariance implicit in Newton’s laws, but also is, at a fundamental level, at odds with the basic ingredient of classical mechanics — that one particle can exert a force on another, depending only on their simultaneous but different positions. Finally general relativity brought out the narrowness of the assumption that the coordinates of a particle are in a Euclidean space, indicating instead not only that on the largest scales these coordinates describe a curved manifold rather than a flat space, but also that this geometry is itself a dynamical field. Indeed, most of 20th century physics goes beyond classical Newto- nian mechanics in one way or another. As many readers of this book expect to become physicists working at the cutting edge of physics re- search, and therefore will need to go beyond classical mechanics, we begin with a few words of justification for investing effort in under- standing classical mechanics. First of all, classical mechanics is still very useful in itself, and not just for engineers. Consider the problems (scientific — not political) that NASA faces if it wants to land a rocket on a planet. This requires 1.1. INTRODUCTION 3 an accuracy of predicting the position of both planet and rocket far beyond what one gets assuming Kepler’s laws, which is the motion one predicts by treating the planet as a point particle influenced only by the Newtonian gravitational field of the Sun, also treated as a point particle. NASA must consider other effects, and either demonstrate that they are ignorable or include them into the calculations. These include • multipole moments of the sun • forces due to other planets • effects of corrections to Newtonian gravity due to general relativ- ity • friction due to the solar wind and gas in the solar system Learning how to estimate or incorporate such effects is not trivial. Secondly, classical mechanics is not a dead field of research — in fact, in the last two decades there has been a great deal of interest in “dynamical systems”. Attention has shifted from calculation of the or- bit over fixed intervals of time to questions of the long-term stability of the motion. New ways of looking at dynamical behavior have emerged, such as chaos and fractal systems. Thirdly, the fundamental concepts of classical mechanics provide the conceptual framework of quantum mechanics. For example, although the Hamiltonian and Lagrangian were developed as sophisticated tech- niques for performing classical mechanics calculations, they provide the basic dynamical objects of quantum mechanics and quantum field the- ory respectively. One view of classical mechanics is as a steepest path approximation to the path integral which describes quantum mechan- ics. This integral over paths is of a classical quantity depending on the “action” of the motion. So classical mechanics is worth learning well, and we might as well jump right in. [...]... particle is the function r(t) of time Certainly one of the central questions of classical mechanics is to determine, given the physical properties of a system and some initial conditions, what the subsequent motion is The required “physical properties” is a specification of the force, F The beginnings of modern classical mechanics 1.2 SINGLE PARTICLE KINEMATICS 5 was the realization at early in the... as producing an acceleration F = ma In focusing on the concept of momentum, Newton emphasized one of the fundamental quantities of physics, useful beyond Newtonian mechanics, in both relativity and quantum mechanics1 Only after using the classical relation of momentum to velocity, p = mv, and the assumption that m is constant, do we find the familiar F = ma One of the principal tools in understanding... the field of a fixed sun, is an ellipse That word does not imply any information about the time dependence or parameterization of the curve 1.2.2 Conserved Quantities While we tend to think of Newtonian mechanics as centered on Newton’s Second Law in the form F = ma, he actually started with the observation that in the absence of a force, there was uniform motion We would now say that under these circumstances... it potential energy U(r) = U(r0 ) + r0 r F (r ) · dr , where r0 is some arbitrary reference position and U(r0 ) is an arbitrarily chosen reference energy, which has no physical significance in ordinary mechanics U(r) represents the potential the force has for doing work on the particle if the particle is at position r rf The condition for the path integral to be independent of the path is that it gives... Now we examine the kinetic energy 1 ˙2 1 T = mi ri = mj x2 ˙j 2 i 2 j where the 3n values mj are not really independent, as each particle has the same mass in all three dimensions in ordinary Newtonian mechanics5 Now  ∆xj xj = lim ˙ = lim  ∆t→0 ∆t ∆t→0  k ∂xj ∂qk q,t ∆qk  ∂xj + ∆t ∂t , q where |q,t means that t and the q’s other than qk are held fixed The last term is due to the possibility that... physical situation is hidden in the large dimensionality of the dependent variable η and in the functional dependence of the velocity function V (η, t) on it There are other systems besides Newtonian mechanics which are controlled by equation (1.13), with a suitable velocity function Collectively these are known as dynamical systems For example, individuals of an asexual mutually hostile species might... of the undamped harmonic oscillator of Figure 1.1 We have discussed generic situations as if the velocity field were chosen arbitrarily from the set of all smooth vector functions, but in fact Newtonian mechanics imposes constraints on the velocity fields in many situations, in particular if there are conserved quantities Effect of conserved quantities on the flow If the system has a conserved quantity Q(q, . rewrite  F ji = 1 2   F ji −  F ij  . Then the last term becomes  ij r i ×  F ji = 1 2  ij r i ×  F ji − 1 2  ij r i ×  F ij = 1 2  ij r i ×  F ji − 1 2  ij r j ×  F ji = 1 2  ij (r i −r j ). will need to go beyond classical mechanics, we begin with a few words of justification for investing effort in under- standing classical mechanics. First of all, classical mechanics is still very. =  ˙ p i =   F i =  i  F E i +  ij  F ji . Let us define  F E =  i F E i to be the total external force.IfNewton’s Third Law holds,  F ji = −  F ij , so  ij  F ij =0, and ˙  P =  F E . (1.3) 1.3.

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