$μ$-Symmetry breaking: an algebraic approach to finding mean fields of quantum many-body systems
arXiv:1504.08113 · doi:10.1103/PhysRevA.94.013613
Abstract
One of the most fundamental problems in quantum many-body systems is the identification of a mean field in spontaneous symmetry breaking which is usually made in a heuristic manner. We propose a systematic method of finding a mean field based on the Lie algebra and the dynamical symmetry by introducing a class of symmetry broken phases which we call $μ$-symmetry breaking. We show that for $μ$-symmetry breaking the quadratic part of an effective Lagrangian of Nambu-Goldstone modes can be block-diagonalized and that homotopy groups of topological excitations can be calculated systematically.
23 pages, 1 figure