Verfügbarkeit: The Fokker-Planck equation

The Fokker-Planck equation: methods of solution and applications

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Bibliographische Detailangaben
1. Verfasser:	Risken, Hannes 1934-1994 (VerfasserIn)
Format:	Buch
Sprache:	German
Veröffentlicht:	Berlin [u.a.] Springer 1996
Ausgabe:	2. ed., study ed.
Schriftenreihe:	Springer series in synergetics 18
Schlagworte:	Statistische Thermodynamik Stochastische Differentialgleichung Brownsche Bewegung Fokker-Planck-Gleichung
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	Hier auch später erschienene, unveränderte Nachdrucke
Beschreibung:	XIV, 472 S. graph. Darst.
ISBN:	354061530X 9783540615309 3540504982

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Datensatz im Suchindex

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adam_text	Contents 1. Introduction .................................................. 1 1.1 Brownian Motion.......................................... 1 1.1.1 Deterministic Differential Equation ..................... 1 1.1.2 Stochastic Differential Equation ........................ 2 1.1.3 Equation of Motion for the Distribution Function ......... 3 1.2 Fokker-Planck Equation .................................... 4 1.2.1 Fokker-Planck Equation for One Variable ............... 4 1.2.2 Fokker-Planck Equation for N Variables ................. 5 1.2.3 How Does a Fokker-Planck Equation Arise? ............. 5 1.2.4 Purpose of the Fokker-Planck Equation ................. 6 1.2.5 Solutions of the Fokker-Planck Equation ................ 7 1.2.6 Kramers and Smoluchowski Equations .................. 7 1.2.7 Generalizations of the Fokker-Planck Equation ........... 8 1.3 Boltzmann Equation ....................................... 9 1.4 Master Equation .......................................... 11 2. Probability Theory ............................................ 13 2.1 Random Variable and Probability Density ..................... 13 2.2 Characteristic Function and Cumulants ....................... 16 2.3 Generalization to Several Random Variables ................... 19 2.3.1 Conditional Probability Density ........................ 21 2.3.2 Cross Correlation .................................... 21 2.3.3 Gaussian Distribution ................................. 23 2.4 Time-Dependent Random Variables .......................... 25 2.4.1 Classification of Stochastic Processes .................... 26 2.4.2 Chapman-Kolmogorov Equation ....................... 28 2.4.3 Wiener-Khintchine Theorem ........................... 29 2.5 Several Time-Dependent Random Variables ................... 30 3. Langevin Equations ........................................... 32 3.1 Langevin Equation for Brownian Motion ...................... 32 3.1.1 Mean-Squared Displacement ........................... 34 3.1.2 Three-Dimensional Case .............................. 36 3.1.3 Calculation of the Stationary Velocity Distribution Function 36 X Contents 3.2 Ornstein-Uhlenbeck Process ................................ 38 3.2.1 Calculation of Moments .............................. 39 3.2.2 Correlation Function ................................ 41 3.2.3 Solution by Fourier Transformation .................... 42 3.3 Nonlinear Langevin Equation, One Variable .................. 44 3.3.1 Example ........................................... 45 3.3.2 Kramers-Moyal Expansion Coefficients ................. 48 3.3.3 Itô s and Stratonovich s Definitions .................... 50 3.4 Nonlinear Langevin Equations, Several Variables .............. 54 3.4.1 Determination of the Langevin Equation from Drift and Diffusion Coefficients ............................... 56 3.4.2 Transformation of Variables .......................... 57 3.4.3 How to Obtain Drift and Diffusion Coefficients for Systems 58 3.5 Markov Property ......................................... 59 3.6 Solutions of the Langevin Equation by Computer Simulation ___ 60 4. Fokker-Planck Equation ....................................... 63 4.1 Kramers-Moyal Forward Expansion ......................... 63 4.1.1 Formal Solution .................................... 66 4.2 Kramers-Moyal Backward Expansion ........................ 67 4.2.1 Formal Solution .................................... 69 4.2.2 Equivalence of the Solutions of the Forward and Backward Equations .......................................... 69 4.3 Pawula Theorem ......................................... 70 4.4 Fokker-Planck Equation for One Variable .................... 72 4.4.1 Transition Probability Density for Small Times .......... 73 4.4.2 Path Integral Solutions ............................... 74 4.5 Generation and Recombination Processes .................... 76 4.6 Application of Truncated Kramers-Moyal Expansions .......... 77 4.7 Fokker-Planck Equation for JV Variables ..................... 81 4.7.1 Probability Current .................................. 84 4.7.2 Joint Probability Distribution ......................... 85 4.7.3 Transition Probability Density for Small Times .......... 85 4.8 Examples for Fokker-Planck Equations with Several Variables ... 86 4.8.1 Three-Dimensional Brownian Motion without Position Variable ........................................... 86 4.8.2 One-Dimensional Brownian Motion in a Potential ........ 87 4.8.3 Three-Dimensional Brownian Motion in an External Force 87 4.8.4 Brownian Motion of Two Interacting Particles in an External Potential ........................................... 88 4.9 Transformation of Variables ............................... 88 4.10 Covariant Form of the Fokker-Planck Equation ............... 91 5. Fokker-Planck Equation for One Variable; Methods of Solution ...... 96 5.1 Normalization ........................................... 96 5.2 Stationary Solution ....................................... 98 Contents XI 5.3 Ornstein-Uhlenbeck Process................................ 99 5.4 Eigenfunction Expansion .................................. 101 5.5 Examples ................................................ 108 5.5.1 Parabolic Potential ................................. 108 5.5.2 Inverted Parabolic Potential ......................... 109 5.5.3 Infinite Square Well for the Schrödinger Potential ....... 110 5.5.4 F-Shaped Potential for the Fokker-Planck Equation ..... Ill 5.6 Jump Conditions ......................................... 112 5.7 A Bistable Model Potential ................................. 114 5.8 Eigenfunctions and Eigenvalues of Inverted Potentials ......... 117 5.9 Approximate and Numerical Methods for Determining Eigenvalues and Eigenfunctions ............................. 119 5.9.1 Variational Method ................................. 120 5.9.2 Numerical Integration .............................. 120 5.9.3 Expansion into a Complete Set ....................... 121 5.10 Diffusion Over a Barrier ................................... 122 5.10.1 Kramers Escape Rate ............................... 123 5.10.2 Bistable and Metastable Potential ..................... 125 6. Fokker-Planck Equation for Several Variables; Methods of Solution .. 133 6.1 Approach of the Solutions to a Limit Solution ................. 134 6.2 Expansion into a Biorthogonal Set .......................... 137 6.3 Transformation of the Fokker-Planck Operator, Eigenfunction Expansions .............................................. 139 6.4 Detailed Balance ......................................... 145 6.5 Ornstein-Uhlenbeck Process ................................ 153 6.6 Further Methods for Solving the Fokker-Planck Equation ...... 158 6.6.1 Transformation of Variables ......................... 158 6.6.2 Variational Method ................................. 158 6.6.3 Reduction to an Hermitian Problem ................... 159 6.6.4 Numerical Integration .............................. 159 6.6.5 Expansion into Complete Sets ........................ 159 6.6.6 Matrix Continued-Fraction Method ................... 160 6.6.7 WKB Method ...................................... 162 7. Linear Response and Correlation Functions ....................... 163 7.1 Linear Response Function ................................. 164 7.2 Correlation Functions ..................................... 166 7.3 Susceptibility ............................................ 172 8. Reduction of the Number of Variables ............................ 179 8.1 First-Passage Time Problems ............................... 179 8.2 Drift and Diffusion Coefficients Independent of Some Variables 183 8.2.1 Time Integrals of Markovian Variables ................ 184 XII Contents 8.3 Adiabatic Elimination of Fast Variables ..................... 188 8.3.1 Linear Process with Respect to the Fast Variable ....... 192 8.3.2 Connection to the Nakajima-Zwanzig Projector Formalism ....................................... 194 9. Solutions of Tridiagonal Recurrence Relations, Application to Ordinary and Partial Differential Equations .............................. 196 9.1 Applications and Forms of Tridiagonal Recurrence Relations ... 197 9.1.1 Scalar Recurrence Relation ......................... 197 9.1.2 Vector Recurrence Relation ......................... 199 9.2 Solutions of Scalar Recurrence Relations .................... 203 9.2.1 Stationary Solution ................................ 203 9.2.2 Initial Value Problem .............................. 209 9.2.3 Eigenvalue Problem ............................... 214 9.3 Solutions of Vector Recurrence Relations .................... 216 9.3.1 Initial Value Problem .............................. 217 9.3.2 Eigenvalue Problem ............................... 220 9.4 Ordinary and Partial Differential Equations with Multiplicative Harmonic Time-Dependent Parameters ..................... 222 9.4.1 Ordinary Differential Equations ..................... 222 9.4.2 Partial Differential Equations ....................... 225 9.5 Methods for Calculating Continued Fractions ................ 226 9.5.1 Ordinary Continued Fractions ....................... 226 9.5.2 Matrix Continued Fractions ......................... 227 10. Solutions of the Kramers Equation .............................. 229 10.1 Forms of the Kramers Equation ............................ 229 10.1.1 Normalization of Variables ......................... 230 10.1.2 Reversible and Irreversible Operators ................. 231 10.1.3 Transformation of the Operators .................... 233 10.1.4 Expansion into Hermite Functions ................... 234 10.2 Solutions for a Linear Force ............................... 237 10.2.1 Transition Probability ............................. 238 10.2.2 Eigenvalues and Eigenfunctions ..................... 241 10.3 Matrix Continued-Fraction Solutions of the Kramers Equation . 249 10.3.1 Initial Value Problem .............................. 251 10.3.2 Eigenvalue Problem ............................... 255 10.4 Inverse Friction Expansion ................................ 257 10.4.1 Inverse Friction Expansion for K0(t), GOtO{t) and L0{t) · · 259 10.4.2 Determination of Eigenvalues and Eigenvectors ........ 266 10.4.3 Expansion for the Green s Function Gn>m(/) ........... 268 10.4.4 Position-Dependent Friction ........................ 275 11. Brownian Motion in Periodic Potentials ......................... 276 11.1 Applications ............................................ 280 11.1.1 Pendulum ........................................ 280 Contents XIII 11.1.2 Superionic Conductor .............................. 280 11.1.3 Josephson Tunneling Junction ...................... 281 11.1.4 Rotation of Dipoles in a Constant Field ............... 282 11.1.5 Phase-Locked Loop ............................... 283 11.1.6 Connection to the Sine-Gordon Equation ............. 285 11.2 Normalization of the Langevin and Fokker-Planck Equations .. 286 11.3 High-Friction Limit ...................................... 287 11.3.1 Stationary Solution ................................ 287 11.3.2 Time-Dependent Solution .......................... 294 11.4 Low-Friction Limit ...................................... 300 11.4.1 Transformation to E and χ Variables ................. 301 11.4.2 Ansatz for the Stationary Distribution Functions ...... 304 11.4.3 x-Independent Functions ........................... 306 11.4.4 x-Dependent Functions ............................. 307 11.4.5 Corrected x-Independent Functions and Mobility ....... 310 11.5 Stationary Solutions for Arbitrary Friction .................. 314 11.5.1 Periodicity of the Stationary Distribution Function ..... 315 11.5.2 Matrix Continued-Fraction Method .................. 317 11.5.3 Calculation of the Stationary Distribution Function ___ 320 11.5.4 Alternative Matrix Continued Fraction for the Cosine Potential ......................................... 325 11.6 Bistability between Running and Locked Solution ............ 328 11.6.1 Solutions Without Noise ........................... 329 11.6.2 SolutionsWithNoise .............................. 334 11.6.3 Low-Friction Mobility With Noise ................... 335 11.7 Instationary Solutions .................................... 337 11.7.1 Diffusion Constant ................................ 342 11.7.2 Transition Probability for Large Times ............... 343 11.8 Susceptibilities .......................................... 347 11.8.1 Zero-Friction Limit ................................ 355 11.9 Eigenvalues and Eigenfunctions ............................ 359 11.9.1 Eigenvalues and Eigenfunctions in the Low-Friction Limit 365 12. Statistical Properties of Laser Light ............................. 374 12.1 Semiclassical Laser Equations ............................. 377 12.1.1 Equations Without Noise ........................... 377 12.1.2 Langevin Equation ................................ 379 12.1.3 Laser Fokker-Planck Equation ...................... 382 12.2 Stationary Solution and Its Expectation Values ............... 384 12.3 Expansion in Eigenmodes ................................. 387 12.4 Expansion into a Complete Set; Solution by Matrix Continued Fractions ............................................... 394 12.4.1 Determination of Eigenvalues ....................... 396 12.5 Transient Solution ....................................... 398 12.5.1 Eigenfunction Method ............................. 398 12.5.2 Expansion into a Complete Set ...................... 401 12.5.3 Solution for Large Pump Parameters ................. 404 XIV Contents 12.6 Photoelectron Counting Distribution ....................... 408 12.6.1 Counting Distribution for Short Intervals ............. 409 12.6.2 Expectation Values for Arbitrary Intervals ............ 412 Appendices ..................................................... 414 Al Stochastic Differential Equations with Colored Gaussian Noise 414 A2 Boltzmann Equation with BGK and SW Collision Operators ... 420 A3 Evaluation of a Matrix Continued Fraction for the Harmonic Oscillator .............................................. 422 A4 Damped Quantum-Mechanical Harmonic Oscillator .......... 425 A5 Alternative Derivation of the Fokker-Planck Equation ........ 429 A6 Fluctuating Control Parameter ............................ 431 S. Supplement to the Second Edition ............................... 436 5.1 Solutions of the Fokker-Planck Equation by Computer Simulation (Sect. 3.6) .................................... 436 5.2 Kramers-Moyal Expansion (Sect. 4.6)....................... 436 5.3 Example for the Covariant Form of the Fokker-Planck Equation (Sect. 4.10) ............................................. 437 5.4 Connection to Supersymmetry and Exact Solutions of the One Variable Fokker-Planck Equation (Chap. 5) ............. 438 5.5 Nondifferentiability of the Potential for the Weak Noise Expansion (Sects. 6.6 and 6.7) ............................. 438 5.6 Further Applications of Matrix Continued-Fractions (Chap. 9)............................................... 439 5.7 Brownian Motion in a Double-Well Potential (Chaps. 10 and 11)....................................... 439 5.8 Boundary Layer Theory (Sect. 11.4) ........................ 440 5.9 Calculation of Correlation Times (Sect. 7.12) ................ 441 5.10 Colored Noise (Appendix Al) ............................. 443 S. 11 Fokker-Planck Equation with a Non-Positive-Definite Diffusion Matrix and Fokker-Planck Equation with Additional Third- Order-Derivative Terms .................................. 445 References ...................................................... 448 Subject Index ................................................... 463
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author	Risken, Hannes 1934-1994
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id	DE-604.BV010903747
illustrated	Illustrated
indexdate	2024-07-09T18:00:53Z
institution	BVB
isbn	354061530X 9783540615309 3540504982
language	German
oai_aleph_id	oai:aleph.bib-bvb.de:BVB01-007293026
oclc_num	246734894
open_access_boolean
owner	DE-703 DE-91G DE-BY-TUM DE-19 DE-BY-UBM DE-384 DE-355 DE-BY-UBR DE-83 DE-11 DE-188 DE-473 DE-BY-UBG DE-20 DE-824 DE-29T
owner_facet	DE-703 DE-91G DE-BY-TUM DE-19 DE-BY-UBM DE-384 DE-355 DE-BY-UBR DE-83 DE-11 DE-188 DE-473 DE-BY-UBG DE-20 DE-824 DE-29T
physical	XIV, 472 S. graph. Darst.
publishDate	1996
publishDateSearch	1996
publishDateSort	1996
publisher	Springer
record_format	marc
series	Springer series in synergetics
series2	Springer series in synergetics
spelling	Risken, Hannes 1934-1994 Verfasser (DE-588)133955133 aut The Fokker-Planck equation methods of solution and applications H. Risken 2. ed., study ed. Berlin [u.a.] Springer 1996 XIV, 472 S. graph. Darst. txt rdacontent n rdamedia nc rdacarrier Springer series in synergetics 18 Hier auch später erschienene, unveränderte Nachdrucke Statistische Thermodynamik (DE-588)4126251-7 gnd rswk-swf Stochastische Differentialgleichung (DE-588)4057621-8 gnd rswk-swf Brownsche Bewegung (DE-588)4128328-4 gnd rswk-swf Fokker-Planck-Gleichung (DE-588)4126333-9 gnd rswk-swf Fokker-Planck-Gleichung (DE-588)4126333-9 s DE-604 Statistische Thermodynamik (DE-588)4126251-7 s 1\p DE-604 Stochastische Differentialgleichung (DE-588)4057621-8 s 2\p DE-604 Brownsche Bewegung (DE-588)4128328-4 s 3\p DE-604 Springer series in synergetics 18 (DE-604)BV000005271 18 Digitalisierung UB Bamberg application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=007293026&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis 1\p cgwrk 20201028 DE-101 https://d-nb.info/provenance/plan#cgwrk 2\p cgwrk 20201028 DE-101 https://d-nb.info/provenance/plan#cgwrk 3\p cgwrk 20201028 DE-101 https://d-nb.info/provenance/plan#cgwrk
spellingShingle	Risken, Hannes 1934-1994 The Fokker-Planck equation methods of solution and applications Springer series in synergetics Statistische Thermodynamik (DE-588)4126251-7 gnd Stochastische Differentialgleichung (DE-588)4057621-8 gnd Brownsche Bewegung (DE-588)4128328-4 gnd Fokker-Planck-Gleichung (DE-588)4126333-9 gnd
subject_GND	(DE-588)4126251-7 (DE-588)4057621-8 (DE-588)4128328-4 (DE-588)4126333-9
title	The Fokker-Planck equation methods of solution and applications
title_auth	The Fokker-Planck equation methods of solution and applications
title_exact_search	The Fokker-Planck equation methods of solution and applications
title_full	The Fokker-Planck equation methods of solution and applications H. Risken
title_fullStr	The Fokker-Planck equation methods of solution and applications H. Risken
title_full_unstemmed	The Fokker-Planck equation methods of solution and applications H. Risken
title_short	The Fokker-Planck equation
title_sort	the fokker planck equation methods of solution and applications
title_sub	methods of solution and applications
topic	Statistische Thermodynamik (DE-588)4126251-7 gnd Stochastische Differentialgleichung (DE-588)4057621-8 gnd Brownsche Bewegung (DE-588)4128328-4 gnd Fokker-Planck-Gleichung (DE-588)4126333-9 gnd
topic_facet	Statistische Thermodynamik Stochastische Differentialgleichung Brownsche Bewegung Fokker-Planck-Gleichung
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=007293026&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV000005271
work_keys_str_mv	AT riskenhannes thefokkerplanckequationmethodsofsolutionandapplications

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