Open AccessStabilizing and destabilizing perturbations of PT -symmetric indefinitely damped systems
Author(s) -
Oleg N. Kirillov
Publication year - 2013
Publication title -
philosophical transactions of the royal society a mathematical physical and engineering sciences
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.074
H-Index - 169
eISSN - 1471-2962
pISSN - 1364-503X
DOI - 10.1098/rsta.2012.0051
Subject(s) - eigenvalues and eigenvectors , singularity , physics , hamiltonian system , classical mechanics , instability , hamiltonian (control theory) , tangent , symmetry (geometry) , mathematical analysis , mathematical physics , mathematics , quantum mechanics , geometry , mathematical optimization
Eigenvalues of a potential dynamical system with damping forces that are described by an indefinite real symmetric matrix can behave as those of a Hamiltonian system when gain and loss are in a perfect balance. This happens when the indefinitely damped system obeys parity–time () symmetry. How do pure imaginary eigenvalues of a stable-symmetric indefinitely damped system behave when variation in the damping and potential forces destroys the symmetry? We establish that it is essentially the tangent cone to the stability domain at the exceptional point corresponding to the Whitney umbrella singularity on the stability boundary that manages transfer of instability between modes.
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