Group Analysis of Classical Lattice Systems [E-Book] / edited by C. Gruber, A. Hintermann, D. Merlini.
Saved in:
Full text |
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Personal Name(s): | Gruber, C., editor |
Hintermann, A., editor / Merlini, D., editor | |
Imprint: |
Berlin, Heidelberg :
Springer,
1977
|
Physical Description: |
XIV, 331 p. online resource. |
Note: |
englisch |
ISBN: |
9783540374077 |
DOI: |
10.1007/3-540-08137-2 |
Series Title: |
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Lecture Notes in Physics ;
60 |
Subject (LOC): |
- Definitions and group structure
- The duality transformation
- Duality relation for the correlation functions
- Phase transitions with spontaneous symmetry breakdown. Ergodic decomposition
- Series and cluster expansion an application of universality hypothesis a “generalized” droplet-model
- The partial trace transformation. Equation for the correlation functions and representation of the symmetry group
- Invariant equilibrium states and duality transformation for infinite systems
- Asano contraction and group structure. Analyticity properties of the free energy
- Analyticity and uniqueness of the invariant equilibrium state
- Definitions and group structure for systems with constraints
- Expansions for the partition function
- Partial trace method and equilibrium equations
- Duality transformation restricted to finite bonds
- Asano contractions and unicity of state
- General framework of higher spin systems
- Physical implications of the group structure
- Spin 1 lattice systems
- The duality transformation
- Zeroes of the partition function.