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- Title
Quasiaverages, symmetry breaking and irreducible Green functions method.
- Authors
Kuzemsky, A. L.
- Abstract
The development and applications of the method of quasiaverages to quantum statistical physics and to quantum solid state theory and, in particular, to quantum theory of magnetism, were considered. It was shown that the role of symmetry (and the breaking of symmetries) in combination with the degeneracy of the system was reanalyzed and essentially clarified within the framework of the method of quasiaverages. The problem of finding the ferromagnetic, antiferromagnetic and superconducting "symmetry broken" solutions of the correlated lattice fermion models was discussed within the irreducible Green functions method. A unified scheme for the construction of generalized mean fields (elastic scattering corrections) and self-energy (inelastic scattering) in terms of the equations of motion and Dyson equation was generalized in order to include the "source fields". This approach complements previous studies of microscopic theory of antiferromagnetism and clarifies the concepts of Neel sublattices for localized and itinerant antiferromagnetism and "spin-aligning fields" of correlated lattice fermions.
- Subjects
CONDENSED matter; QUANTUM solids; GREEN'S functions; QUANTUM statistics; STATISTICAL physics; QUANTUM theory; FERROMAGNETIC materials
- Publication
Condensed Matter Physics, 2010, Vol 13, Issue 4, p1
- ISSN
1607-324X
- Publication type
Article