Verfügbarkeit: Statistical physics

Statistical physics: an introduction

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Bibliographische Detailangaben
1. Verfasser:	Yoshioka, Daijiro 1949- (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Berlin [u.a.] Springer 2007
Schlagworte:	Physique statistique Statistical physics Statistische Physik Lehrbuch
Online-Zugang:	Inhaltstext Inhaltsverzeichnis
Beschreibung:	Angekündigt u.d.T.: Yoshioka, Daijiro: Introduction to statistical physics
Beschreibung:	XII, 208 S. Ill., graph. Darst.
ISBN:	3540286055 9783540286059

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adam_text	CONTENTS PART I GENERAL PRINCIPLES 1 THERMAL EQUILIBRIUM AND THE PRINCIPLE OF EQUAL PROBABILITY ....................................... 3 1.1 INTRODUCTIONTOTHERMALANDSTATISTICALPHYSICS............. 3 1.2 THERMAL EQUILIBRIUM .................................... 4 1.2.1 DESCRIPTION OF A SYSTEM IN EQUILIBRIUM............... 4 1.2.2 STATEVARIABLES,WORK,ANDHEAT .................... 5 1.2.3 TEMPERATURE AND THE ZEROTH LAW OF THERMODYNAMICS.. 7 1.2.4 HEATCAPACITYANDSPECIFICHEAT .................... 8 1.3 KINETICTHEORYOFGASMOLECULES .......................... 9 1.3.1 THESPATIALDISTRIBUTIONOFGASMOLECULES............ 10 1.3.2 VELOCITYDISTRIBUTIONOFANIDEALGAS ................ 15 1.3.3 THEPRESSUREOFAGAS ............................. 18 1.4 THE PRINCIPLE OF EQUAL PROBABILITY......................... 20 2 ENTROPY ................................................... 23 2.1 THEMICROCANONICALDISTRIBUTION .......................... 23 2.2 NUMBEROFSTATESANDDENSITYOFSTATES .................... 26 2.3 CONDITIONS FOR THERMAL EQUILIBRIUM ....................... 28 2.3.1 EQUILIBRIUM CONDITION WHENONLYENERGYISEXCHANGED..................... 28 2.3.2 EQUILIBRIUM CONDITION WHEN MOLECULES ARE EXCHANGED . 30 2.3.3 EQUILIBRIUM CONDITION WHEN TWO SYSTEMS SHAREACOMMONVOLUME........................... 31 2.4 THERMAL NONEQUILIBRIUM AND IRREVERSIBLE PROCESSES .......... 32 3 THE PARTITION FUNCTION AND THE FREE ENERGY ............... 35 3.1 ASYSTEMINAHEATBATH................................. 35 3.1.1 CANONICALDISTRIBUTION............................. 36 3.1.2 APPLICATIONTOAMOLECULEINGAS.................... 37 VIII CONTENTS 3.2 PARTITIONFUNCTION....................................... 38 3.3 FREEENERGY ............................................ 39 3.4 INTERNALENERGY ......................................... 41 3.5 THERMODYNAMIC FUNCTIONS ANDLEGENDRETRANSFORMATIONS ............................ 42 3.6 MAXWELLRELATIONS....................................... 43 PART II ELEMENTARY APPLICATIONS 4 IDEAL GASES ................................................ 47 4.1 QUANTUMMECHANICSOFAGASMOLECULE..................... 47 4.2 PHASESPACEANDTHENUMBEROFMICROSCOPICSTATES.......... 49 4.3 ENTROPYOFANIDEALGAS.................................. 51 4.4 PRESSURE OF AN IDEAL GAS: QUANTUMMECHANICALTREATMENT .......................... 54 4.5 STATISTICAL-MECHANICALTEMPERATUREANDPRESSURE............ 55 4.6 PARTITIONFUNCTIONOFANIDEALGAS......................... 56 4.7 DIATOMICMOLECULES...................................... 58 4.7.1 DECOMPOSITIONOFTHEPARTITIONFUNCTION ............. 58 4.7.2 CENTER-OF-GRAVITY PART: Z (CG) ...................... 60 4.7.3 VIBRATIONAL PART: Z (V) ............................. 61 4.7.4 ROTATIONAL PART: Z (R) .............................. 64 5 THE HEAT CAPACITY OF A SOLID, AND BLACK-BODY RADIATION ................................. 67 5.1 HEATCAPACITYOFASOLIDI-EINSTEINMODEL ................ 67 5.2 HEATCAPACITYOFASOLIDII-DEBYEMODEL ................. 70 5.2.1 COLLECTIVE OSCILLATIONS OF THE LATTICE ANDTHEINTERNALENERGY............................ 70 5.2.2 HEATCAPACITYATHIGHTEMPERATURE ................. 73 5.2.3 HEATCAPACITYATLOWTEMPERATURE.................. 74 5.2.4 HEATCAPACITYATINTERMEDIATETEMPERATURE .......... 74 5.2.5 PHYSICAL EXPLANATION FOR THE TEMPERATURE DEPENDENCE. 75 5.3 BLACK-BODYRADIATION.................................... 76 5.3.1 WIEN SLAWANDSTEFAN SLAW....................... 76 5.3.2 ENERGYOFRADIATIONINACAVITY..................... 77 5.3.3 SPECTRUMOFLIGHTEMITTEDFROMAHOLE .............. 78 5.3.4 THETEMPERATUREOFTHEUNIVERSE.................... 80 6 THE ELASTICITY OF RUBBER .................................. 83 6.1 CHARACTERISTICSOFRUBBER ................................ 83 6.2 MODELOFRUBBER........................................ 84 6.3 ENTROPYOFRUBBER ...................................... 85 6.4 HOOKE SLAW............................................ 86 CONTENTS IX 7 MAGNETIC MATERIALS ........................................ 89 7.1 ORIGINOFPERMANENTMAGNETISM........................... 89 7.2 STATISTICALMECHANICSOFAFREESPINSYSTEM................. 91 7.2.1 MODELANDENTROPY................................ 91 7.2.2 FREE ENERGY, MAGNETIZATION, AND SUSCEPTIBILITY ........ 93 7.2.3 INTERNALENERGYANDHEATCAPACITY.................. 95 7.3 ISINGMODEL-MEAN-FIELDAPPROXIMATION................... 97 7.3.1 LINKS ............................................ 97 7.3.2 MEAN-FIELDAPPROXIMATION ......................... 99 7.3.3 SOLUTIONOFTHESELF-CONSISTENTEQUATION..............100 7.3.4 ENTROPYANDHEATCAPACITY.........................103 7.3.5 SUSCEPTIBILITY .....................................105 7.3.6 DOMAINSTRUCTURE .................................106 7.4 THEONE-DIMENSIONALISINGMODEL.........................106 7.4.1 FREEENERGY ......................................106 7.4.2 ENTROPYANDHEATCAPACITY.........................108 7.4.3 MAGNETIZATION AND SUSCEPTIBILITY ....................110 PART III MORE ADVANCED TOPICS 8 FIRST-ORDER PHASE TRANSITIONS ............................. 115 8.1 THEVARIOUSPHASESOFMATTER.............................115 8.2 SYSTEM IN A HEAT BATH AT FIXED P AND T ...................119 8.3 COEXISTENCEOFPHASES....................................121 8.4 THECLAUSIUS-CLAPEYRONLAW .............................123 8.5 THECRITICALPOINT.......................................126 8.6 THEVANDERWAALSGAS ..................................128 8.6.1 COEXISTENCEOFGASANDLIQUID......................130 9 SECOND-ORDER PHASE TRANSITIONS ........................... 133 9.1 VARIOUSPHASETRANSITIONSANDORDERPARAMETERS............133 9.2 LANDAUTHEORY .........................................134 9.2.1 FREEENERGY ......................................137 9.2.2 ENTROPY,INTERNALENERGY,ANDHEATCAPACITY .........138 9.2.3 CRITICALPHENOMENA................................139 9.3 THETWO-DIMENSIONALISINGMODEL.........................140 10 DENSE GASES - IDEAL GASES AT LOW TEMPERATURE ........... 147 10.1 THE PHASE SPACE FOR N IDENTICALPARTICLES..................147 10.2 THEGRANDCANONICALDISTRIBUTION.........................149 10.3 IDEALFERMIGASESANDIDEALBOSEGASES....................151 10.3.1 OCCUPATIONNUMBERREPRESENTATION .................151 10.3.2 THERMODYNAMICFUNCTIONS .........................154 XC O N T E N T S 10.4 PROPERTIESOFAFREE-FERMIONGAS..........................154 10.4.1 PROPERTIES AT T =0................................157 10.4.2 PROPERTIESATLOWTEMPERATURE .....................160 10.5 PROPERTIESOFAFREE-BOSONGAS............................169 10.5.1 THETWOKINDSOFBOSEGAS ........................169 10.5.2 PROPERTIESATLOWTEMPERATURE .....................170 10.6 PROPERTIESOFGASESATHIGHTEMPERATURE...................178 PART IV APPENDICES A FORMULAS RELATED TO THE FACTORIAL FUNCTION ................ 185 A.1 BINOMIALCOEFFICIENTSANDBINOMIALTHEOREM................185 A.2 STIRLING SFORMULA .......................................185 A.3 N !!.....................................................186 B THE GAUSSIAN DISTRIBUTION FUNCTION ....................... 187 B.1 THECENTRALLIMITTHEOREM ..............................187 B.1.1 EXAMPLE .........................................188 B.2 GAUSSIANINTEGRALS.......................................188 B.3 THE FOURIER TRANSFORM OF A GAUSSIAN DISTRIBUTION FUNCTION...189 C LAGRANGE S METHOD OF UNDETERMINED MULTIPLIERS ............................... 191 C.1 EXAMPLE ...............................................192 C.2 GENERALIZATION ..........................................192 D VOLUME OF A HYPERSPHERE .................................. 193 E HYPERBOLIC FUNCTIONS ...................................... 195 F BOUNDARY CONDITIONS ...................................... 197 F.1 FIXED BOUNDARY CONDITION ...............................197 F.2 PERIODIC BOUNDARY CONDITION .............................198 G THE RIEMANN ZETA FUNCTION ............................... 201 REFERENCES ..................................................... 203 INDEX .......................................................... 205
adam_txt	CONTENTS PART I GENERAL PRINCIPLES 1 THERMAL EQUILIBRIUM AND THE PRINCIPLE OF EQUAL PROBABILITY . 3 1.1 INTRODUCTIONTOTHERMALANDSTATISTICALPHYSICS. 3 1.2 THERMAL EQUILIBRIUM . 4 1.2.1 DESCRIPTION OF A SYSTEM IN EQUILIBRIUM. 4 1.2.2 STATEVARIABLES,WORK,ANDHEAT . 5 1.2.3 TEMPERATURE AND THE ZEROTH LAW OF THERMODYNAMICS. 7 1.2.4 HEATCAPACITYANDSPECIFICHEAT . 8 1.3 KINETICTHEORYOFGASMOLECULES . 9 1.3.1 THESPATIALDISTRIBUTIONOFGASMOLECULES. 10 1.3.2 VELOCITYDISTRIBUTIONOFANIDEALGAS . 15 1.3.3 THEPRESSUREOFAGAS . 18 1.4 THE PRINCIPLE OF EQUAL PROBABILITY. 20 2 ENTROPY . 23 2.1 THEMICROCANONICALDISTRIBUTION . 23 2.2 NUMBEROFSTATESANDDENSITYOFSTATES . 26 2.3 CONDITIONS FOR THERMAL EQUILIBRIUM . 28 2.3.1 EQUILIBRIUM CONDITION WHENONLYENERGYISEXCHANGED. 28 2.3.2 EQUILIBRIUM CONDITION WHEN MOLECULES ARE EXCHANGED . 30 2.3.3 EQUILIBRIUM CONDITION WHEN TWO SYSTEMS SHAREACOMMONVOLUME. 31 2.4 THERMAL NONEQUILIBRIUM AND IRREVERSIBLE PROCESSES . 32 3 THE PARTITION FUNCTION AND THE FREE ENERGY . 35 3.1 ASYSTEMINAHEATBATH. 35 3.1.1 CANONICALDISTRIBUTION. 36 3.1.2 APPLICATIONTOAMOLECULEINGAS. 37 VIII CONTENTS 3.2 PARTITIONFUNCTION. 38 3.3 FREEENERGY . 39 3.4 INTERNALENERGY . 41 3.5 THERMODYNAMIC FUNCTIONS ANDLEGENDRETRANSFORMATIONS . 42 3.6 MAXWELLRELATIONS. 43 PART II ELEMENTARY APPLICATIONS 4 IDEAL GASES . 47 4.1 QUANTUMMECHANICSOFAGASMOLECULE. 47 4.2 PHASESPACEANDTHENUMBEROFMICROSCOPICSTATES. 49 4.3 ENTROPYOFANIDEALGAS. 51 4.4 PRESSURE OF AN IDEAL GAS: QUANTUMMECHANICALTREATMENT . 54 4.5 STATISTICAL-MECHANICALTEMPERATUREANDPRESSURE. 55 4.6 PARTITIONFUNCTIONOFANIDEALGAS. 56 4.7 DIATOMICMOLECULES. 58 4.7.1 DECOMPOSITIONOFTHEPARTITIONFUNCTION . 58 4.7.2 CENTER-OF-GRAVITY PART: Z (CG) . 60 4.7.3 VIBRATIONAL PART: Z (V) . 61 4.7.4 ROTATIONAL PART: Z (R) . 64 5 THE HEAT CAPACITY OF A SOLID, AND BLACK-BODY RADIATION . 67 5.1 HEATCAPACITYOFASOLIDI-EINSTEINMODEL . 67 5.2 HEATCAPACITYOFASOLIDII-DEBYEMODEL . 70 5.2.1 COLLECTIVE OSCILLATIONS OF THE LATTICE ANDTHEINTERNALENERGY. 70 5.2.2 HEATCAPACITYATHIGHTEMPERATURE . 73 5.2.3 HEATCAPACITYATLOWTEMPERATURE. 74 5.2.4 HEATCAPACITYATINTERMEDIATETEMPERATURE . 74 5.2.5 PHYSICAL EXPLANATION FOR THE TEMPERATURE DEPENDENCE. 75 5.3 BLACK-BODYRADIATION. 76 5.3.1 WIEN'SLAWANDSTEFAN'SLAW. 76 5.3.2 ENERGYOFRADIATIONINACAVITY. 77 5.3.3 SPECTRUMOFLIGHTEMITTEDFROMAHOLE . 78 5.3.4 THETEMPERATUREOFTHEUNIVERSE. 80 6 THE ELASTICITY OF RUBBER . 83 6.1 CHARACTERISTICSOFRUBBER . 83 6.2 MODELOFRUBBER. 84 6.3 ENTROPYOFRUBBER . 85 6.4 HOOKE'SLAW. 86 CONTENTS IX 7 MAGNETIC MATERIALS . 89 7.1 ORIGINOFPERMANENTMAGNETISM. 89 7.2 STATISTICALMECHANICSOFAFREESPINSYSTEM. 91 7.2.1 MODELANDENTROPY. 91 7.2.2 FREE ENERGY, MAGNETIZATION, AND SUSCEPTIBILITY . 93 7.2.3 INTERNALENERGYANDHEATCAPACITY. 95 7.3 ISINGMODEL-MEAN-FIELDAPPROXIMATION. 97 7.3.1 LINKS . 97 7.3.2 MEAN-FIELDAPPROXIMATION . 99 7.3.3 SOLUTIONOFTHESELF-CONSISTENTEQUATION.100 7.3.4 ENTROPYANDHEATCAPACITY.103 7.3.5 SUSCEPTIBILITY .105 7.3.6 DOMAINSTRUCTURE .106 7.4 THEONE-DIMENSIONALISINGMODEL.106 7.4.1 FREEENERGY .106 7.4.2 ENTROPYANDHEATCAPACITY.108 7.4.3 MAGNETIZATION AND SUSCEPTIBILITY .110 PART III MORE ADVANCED TOPICS 8 FIRST-ORDER PHASE TRANSITIONS . 115 8.1 THEVARIOUSPHASESOFMATTER.115 8.2 SYSTEM IN A HEAT BATH AT FIXED P AND T .119 8.3 COEXISTENCEOFPHASES.121 8.4 THECLAUSIUS-CLAPEYRONLAW .123 8.5 THECRITICALPOINT.126 8.6 THEVANDERWAALSGAS .128 8.6.1 COEXISTENCEOFGASANDLIQUID.130 9 SECOND-ORDER PHASE TRANSITIONS . 133 9.1 VARIOUSPHASETRANSITIONSANDORDERPARAMETERS.133 9.2 LANDAUTHEORY .134 9.2.1 FREEENERGY .137 9.2.2 ENTROPY,INTERNALENERGY,ANDHEATCAPACITY .138 9.2.3 CRITICALPHENOMENA.139 9.3 THETWO-DIMENSIONALISINGMODEL.140 10 DENSE GASES - IDEAL GASES AT LOW TEMPERATURE . 147 10.1 THE PHASE SPACE FOR N IDENTICALPARTICLES.147 10.2 THEGRANDCANONICALDISTRIBUTION.149 10.3 IDEALFERMIGASESANDIDEALBOSEGASES.151 10.3.1 OCCUPATIONNUMBERREPRESENTATION .151 10.3.2 THERMODYNAMICFUNCTIONS .154 XC O N T E N T S 10.4 PROPERTIESOFAFREE-FERMIONGAS.154 10.4.1 PROPERTIES AT T =0.157 10.4.2 PROPERTIESATLOWTEMPERATURE .160 10.5 PROPERTIESOFAFREE-BOSONGAS.169 10.5.1 THETWOKINDSOFBOSEGAS .169 10.5.2 PROPERTIESATLOWTEMPERATURE .170 10.6 PROPERTIESOFGASESATHIGHTEMPERATURE.178 PART IV APPENDICES A FORMULAS RELATED TO THE FACTORIAL FUNCTION . 185 A.1 BINOMIALCOEFFICIENTSANDBINOMIALTHEOREM.185 A.2 STIRLING'SFORMULA .185 A.3 N !!.186 B THE GAUSSIAN DISTRIBUTION FUNCTION . 187 B.1 THECENTRALLIMITTHEOREM .187 B.1.1 EXAMPLE .188 B.2 GAUSSIANINTEGRALS.188 B.3 THE FOURIER TRANSFORM OF A GAUSSIAN DISTRIBUTION FUNCTION.189 C LAGRANGE'S METHOD OF UNDETERMINED MULTIPLIERS . 191 C.1 EXAMPLE .192 C.2 GENERALIZATION .192 D VOLUME OF A HYPERSPHERE . 193 E HYPERBOLIC FUNCTIONS . 195 F BOUNDARY CONDITIONS . 197 F.1 FIXED BOUNDARY CONDITION .197 F.2 PERIODIC BOUNDARY CONDITION .198 G THE RIEMANN ZETA FUNCTION . 201 REFERENCES . 203 INDEX . 205
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spelling	Yoshioka, Daijiro 1949- Verfasser (DE-588)123454190 aut Statistical physics an introduction Daijiro Yoshioka Introduction to statistical physics Berlin [u.a.] Springer 2007 XII, 208 S. Ill., graph. Darst. txt rdacontent n rdamedia nc rdacarrier Angekündigt u.d.T.: Yoshioka, Daijiro: Introduction to statistical physics Physique statistique Statistical physics Statistische Physik (DE-588)4057000-9 gnd rswk-swf (DE-588)4123623-3 Lehrbuch gnd-content Statistische Physik (DE-588)4057000-9 s DE-604 text/html http://deposit.dnb.de/cgi-bin/dokserv?id=2669189&prov=M&dok_var=1&dok_ext=htm Inhaltstext DNB Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=014872717&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Yoshioka, Daijiro 1949- Statistical physics an introduction Physique statistique Statistical physics Statistische Physik (DE-588)4057000-9 gnd
subject_GND	(DE-588)4057000-9 (DE-588)4123623-3
title	Statistical physics an introduction
title_alt	Introduction to statistical physics
title_auth	Statistical physics an introduction
title_exact_search	Statistical physics an introduction
title_exact_search_txtP	Statistical physics an introduction
title_full	Statistical physics an introduction Daijiro Yoshioka
title_fullStr	Statistical physics an introduction Daijiro Yoshioka
title_full_unstemmed	Statistical physics an introduction Daijiro Yoshioka
title_short	Statistical physics
title_sort	statistical physics an introduction
title_sub	an introduction
topic	Physique statistique Statistical physics Statistische Physik (DE-588)4057000-9 gnd
topic_facet	Physique statistique Statistical physics Statistische Physik Lehrbuch
url	http://deposit.dnb.de/cgi-bin/dokserv?id=2669189&prov=M&dok_var=1&dok_ext=htm http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=014872717&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
work_keys_str_mv	AT yoshiokadaijiro statisticalphysicsanintroduction AT yoshiokadaijiro introductiontostatisticalphysics

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