A. A. Mailybaev, O. N. Kirillov, A. P. Seyranian
Published 2005-01-10, updated 2005-02-17Version 4
A wave function picks up, in addition to the dynamic phase, the geometric (Berry) phase when traversing adiabatically a closed cycle in parameter space. We develop a general multidimensional theory of the geometric phase for (double) cycles around exceptional degeneracies in non-Hermitian Hamiltonians. We show that the geometric phase is exactly $\pi$ for symmetric complex Hamiltonians of arbitrary dimension and for nonsymmetric non-Hermitian Hamiltonians of dimension 2. For nonsymmetric non-Hermitian Hamiltonians of higher dimension, the geometric phase tends to $\pi$ for small cycles and changes as the cycle size and shape are varied. We find explicitly the leading asymptotic term of this dependence, and describe it in terms of interaction of different energy levels.
Comments: 4 pages, 1 figure, with revisions in the introduction and conclusion
Journal: Phys. Rev A 72, 014104 (2005)
The physics of exceptional points
Exceptional points of the Lindblad operator of a two-level system
Population transfer at exceptional points in spectra of the hydrogen atom in parallel electric and magnetic fields
