METHODS OF STATISTICAL PHYSICS Thisgraduate-leveltextbookonthermalphysicscoversclassicalthermodynamics, statistical mechanics, and their applications. It describes theoretical methods to calculate thermodynamic properties, such as the equation of state, specific heat, Helmholtzpotential,magneticsusceptibility,andphasetransitionsofmacroscopic systems. Inadditiontothemorestandardmaterialcovered,thisbookalsodescribesmore powerful techniques, which are not found elsewhere, to determine the correlation effects on which the thermodynamic properties are based. Particular emphasis is giventotheclustervariationmethod,andanovelformulationisdevelopedforits expressionintermsofcorrelationfunctions.Applicationsofthismethodtotopics suchasthethree-dimensionalIsingmodel,BCSsuperconductivity,theHeisenberg ferromagnet, the ground state energy of the Anderson model, antiferromagnetism within the Hubbard model, and propagation of short range order, are extensively discussed.ImportantidentitiesrelatingdifferentcorrelationfunctionsoftheIsing modelarealsoderived. Although a basic knowledge of quantum mechanics is required, the mathe- matical formulation is accessible, and the correlation functions can be evaluated either numerically or analytically in the form of infinite series. Based on courses in statistical mechanics and condensed matter theory taught by the author in the UnitedStatesandJapan,thisbookisentirelyself-containedandallessentialmath- ematicaldetailsareincluded.Itwillconstituteanidealcompaniontextforgraduate studentsstudyingcoursesonthetheoryofcomplexanalysis,classicalmechanics, classical electrodynamics, and quantum mechanics. Supplementary material is alsoavailableontheinternetathttp://uk.cambridge.org/resources/0521580560/ TOMOYASU TANAKA obtainedhisDoctorofSciencedegreeinphysicsin1953 from the Kyushu University, Fukuoka, Japan. Since then he has divided his time betweentheUnitedStatesandJapan,andiscurrentlyProfessorEmeritusofPhysics and Astronomy at Ohio University (Athens, USA) and also at Chubu University (Kasugai,Japan).Heistheauthorofover70researchpapersonthetwo-timeGreen’s function theory of the Heisenberg ferromagnet, exact linear identities of the Ising model correlation functions, the theory of super-ionic conduction, and the theory ofmetalhydrides.ProfessorTanakahasalsoworkedextensivelyondevelopingthe clustervariationmethodforcalculatingvariousmany-bodycorrelationfunctions. METHODS OF STATISTICAL PHYSICS TOMOYASU TANAKA    Cambridge, New York, Melbourne, Madrid, Cape Town, Singapore, São Paulo Cambridge University Press   The Edinburgh Building, Cambridge , United Kingdom Published in the United States of America by Cambridge University Press, New York www.cambridge.org Information on this title: www.cambridge.org/9780521580564 © Tomoyasu Tanaka 2002 This book is in copyright. Subject to statutory exception and to the provision of relevant collective licensing agreements, no reproduction of any part may take place without the written permission of Cambridge University Press. First published in print format 2002 - ---- eBook (NetLibrary) - --- eBook (NetLibrary) - ---- hardback - --- hardback - ---- paperback - --- paperback Cambridge University Press has no responsibility for the persistence or accuracy of  s for external or third-party internet websites referred to in this book, and does not guarantee that any content on such websites is, or will remain, accurate or appropriate. TothelateProfessorAkiraHarasima Contents Preface pagexi Acknowledgements xv 1 Thelawsofthermodynamics 1 1.1 Thethermodynamicsystemandprocesses 1 1.2 Thezerothlawofthermodynamics 1 1.3 Thethermalequationofstate 2 1.4 Theclassicalidealgas 4 1.5 Thequasistaticandreversibleprocesses 7 1.6 Thefirstlawofthermodynamics 7 1.7 Theheatcapacity 8 1.8 Theisothermalandadiabaticprocesses 10 1.9 Theenthalpy 12 1.10 Thesecondlawofthermodynamics 12 1.11 TheCarnotcycle 14 1.12 Thethermodynamictemperature 15 1.13 TheCarnotcycleofanidealgas 19 1.14 TheClausiusinequality 22 1.15 Theentropy 24 1.16 Generalintegratingfactors 26 1.17 Theintegratingfactorandcyclicprocesses 28 1.18 Hausen’scycle 30 1.19 Employmentofthesecondlawofthermodynamics 31 1.20 Theuniversalintegratingfactor 32 Exercises 34 2 Thermodynamicrelations 38 2.1 Thermodynamicpotentials 38 2.2 Maxwellrelations 41 vii Contents Preface pagexi Acknowledgements xv 1 Thelawsofthermodynamics 1 1.1 Thethermodynamicsystemandprocesses 1 1.2 Thezerothlawofthermodynamics 1 1.3 Thethermalequationofstate 2 1.4 Theclassicalidealgas 4 1.5 Thequasistaticandreversibleprocesses 7 1.6 Thefirstlawofthermodynamics 7 1.7 Theheatcapacity 8 1.8 Theisothermalandadiabaticprocesses 10 1.9 Theenthalpy 12 1.10 Thesecondlawofthermodynamics 12 1.11 TheCarnotcycle 14 1.12 Thethermodynamictemperature 15 1.13 TheCarnotcycleofanidealgas 19 1.14 TheClausiusinequality 22 1.15 Theentropy 24 1.16 Generalintegratingfactors 26 1.17 Theintegratingfactorandcyclicprocesses 28 1.18 Hausen’scycle 30 1.19 Employmentofthesecondlawofthermodynamics 31 1.20 Theuniversalintegratingfactor 32 Exercises 34 2 Thermodynamicrelations 38 2.1 Thermodynamicpotentials 38 2.2 Maxwellrelations 41 vii Contents ix 5.6 Thefour-sitereduceddensitymatrix 114 5.7 TheprobabilitydistributionfunctionsfortheIsingmodel 121 Exercises 125 6 Theclustervariationmethod 127 6.1 Thevariationalprinciple 127 6.2 Thecumulantexpansion 128 6.3 Theclustervariationmethod 130 6.4 Themean-fieldapproximation 131 6.5 TheBetheapproximation 134 6.6 Four-siteapproximation 137 6.7 Simplifiedclustervariationmethods 141 6.8 Correlationfunctionformulation 144 6.9 ThepointandpairapproximationsintheCFF 145 6.10 ThetetrahedronapproximationintheCFF 147 Exercises 152 7 Infinite-seriesrepresentationsofcorrelationfunctions 153 7.1 Singularityofthecorrelationfunctions 153 7.2 Theclassicalvaluesofthecriticalexponent 154 7.3 Aninfinite-seriesrepresentationofthepartitionfunction 156 7.4 ThemethodofPade´ approximants 158 7.5 Infinite-seriessolutionsoftheclustervariationmethod 161 7.6 Hightemperaturespecificheat 165 7.7 Hightemperaturesusceptibility 167 7.8 Lowtemperaturespecificheat 169 7.9 Infiniteseriesforothercorrelationfunctions 172 Exercises 173 8 Theextendedmean-fieldapproximation 175 8.1 TheWentzelcriterion 175 8.2 TheBCSHamiltonian 178 8.3 Thes–d interaction 184 8.4 ThegroundstateoftheAndersonmodel 190 8.5 TheHubbardmodel 197 8.6 Thefirst-ordertransitionincubicice 203 Exercises 209 9 TheexactIsinglatticeidentities 212 9.1 Thebasicgeneratingequations 212 9.2 Linearidentitiesforodd-numbercorrelations 213 9.3 Star-triangle-typerelationships 216 9.4 Exactsolutiononthetriangularlattice 218