Georgii H.O. — Canonical Gibbs Measures: Some Extensions of de Finetti's Representation Theorem for Interacting Particle Systems :: Электронная библиотека попечительского совета мехмата МГУ

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Georgii H.O. — Canonical Gibbs Measures: Some Extensions of de Finetti's Representation Theorem for Interacting Particle Systems

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Название: Canonical Gibbs Measures: Some Extensions of de Finetti's Representation Theorem for Interacting Particle Systems

Автор: Georgii H.O.

Язык:

Рубрика: Математика/

Статус предметного указателя: Готов указатель с номерами страниц

ed2k: ed2k stats

Год издания: 1979

Количество страниц: 190

Добавлена в каталог: 15.08.2008

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Предметный указатель

Activity      5 22
Activity as a function of $\omega$       103 106 111ff 116 140ff 144 170ff
Activity as a function of $\rho$       67ff 171ff 174ff
Boundary condition      4 21
Choquet simplex      12
Configuration      2 15
Configuration, hard core      16
Configuration, simple      16
cube      64
de Finetti’s theorem      V 11 72
Detailed balance equation      33 43
Diffuse measure      15
Diffusion process with interaction      41
DLR-state      7
Energy      4 21
Energy, specific      65
Energy, specific free      66 80
Energy, specific free Gibbs      65
Energy, specific free Helmholtz      67 171
Energy, specific free Helmholtz, differentiability of      68 171
Energy, specific free, monotonicity of      82
Ensembles      174
Ensembles, equivalence of      175ff
entropy      65
Extreme decomposition      12ff 26 72 103 106 108 117 144 171
Extreme point      11
Gibbs distribution, (grand canonical)      6 22
Gibbs distribution, canonical      9 24
Gibbs measure, (grand canonical)      7 23
Gibbs measure, (grand canonical), extreme      13 27
Gibbs measure, canonical      VII 9 25
Gibbs measure, canonical, characterization of      36 40 92 105
Gibbs measure, canonical, extreme      12ff 26 71 98 99 106 108 116ff 143ff 171
Gibbs measure, canonical, shift-invariant      14
Gibbs measure, microcanonical      VIII
Hamilton flow      50

Hamilton flow, stable equilibrium states for      53
Hewitt — Savage zero-one law      VI 100 109
Information gain      70 73
Intensity measure      20
Irreducible rate function      33
KMS-state      52
Martin — Dynkin boundary      12
Particle density      69 106 133 174
Particle jump process      VII 8 29
Particle jump process, asymptotic distribution of      83
Partition function      6 22
Partition function, canonical      9 25
Phase transition      7 69
Poisson bracket      49
Poisson process      20 24
Poisson process, mixed      VIII 40 105
Potential      4 21
Potential, chemical      5
Potential, continuously differentiable      43
Potential, finite range      21 74
Potential, hard core      21
Potential, pair      22
Potential, self-      15 25
Potential, shift-invariant      14
Potential, standard      48
Pressure      65
Randomness principle      114 141
Reversible measure, process      32 42
Shift      14
Spin-flip process      8 90
Symmetric events      4 19 97 100 108 109 116 144
Symmetric probability measure      V 10
Tail field      4 19 116 144
Variational principle for canonical Gibbs measures      71 81 83
Variational principle for Gibbs measures      66
Zero-one laws      12 13 26 100 109

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