Oleg N. Kirillov
Oleg N. Kirillov
Associate Professor of Applied Mathematics, Northumbria University
Verified email at - Homepage
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Nonconservative stability problems of modern physics
ON Kirillov
Walter de Gruyter GmbH & Co KG, 2021
Geometric phase around exceptional points
AA Mailybaev, ON Kirillov, AP Seyranian
Physical Review A—Atomic, Molecular, and Optical Physics 72 (1), 014104, 2005
Coupling of eigenvalues of complex matrices at diabolic and exceptional points
AP Seyranian, ON Kirillov, AA Mailybaev
Journal of Physics A: Mathematical and General 38 (8), 1723, 2005
Exceptional points in a microwave billiard with time-reversal invariance violation
B Dietz, HL Harney, ON Kirillov, M Miski-Oglu, A Richter, F Schäfer
Physical Review Letters 106 (15), 150403, 2011
Paradoxes of dissipation‐induced destabilization or who opened Whitney's umbrella?
ON Kirillov, F Verhulst
ZAMM‐Journal of Applied Mathematics and Mechanics/Zeitschrift für Angewandte …, 2010
The effect of small internal and external damping on the stability of distributed non-conservative systems
ON Kirillov, AO Seyranian
Journal of Applied Mathematics and Mechanics 69 (4), 529-552, 2005
Local instabilities in magnetized rotational flows: a short-wavelength approach
ON Kirillov, F Stefani, Y Fukumoto
Journal of Fluid Mechanics 760, 591-633, 2014
Destabilization paradox due to breaking the Hamiltonian and reversible symmetry
ON Kirillov
International Journal of Non-Linear Mechanics 42 (1), 71-87, 2007
Unfolding of eigenvalue surfaces near a diabolic point due to a complex perturbation
ON Kirillov, AA Mailybaev, AP Seyranian
Journal of Physics A: Mathematical and General 38 (24), 5531, 2005
A theory of the destabilization paradox in non-conservative systems
ON Kirillov
Acta Mechanica 174 (3), 145-166, 2005
Flutter and divergence instability in the Pflüger column: Experimental evidence of the Ziegler destabilization paradox
D Bigoni, ON Kirillov, D Misseroni, G Noselli, M Tommasini
Journal of the Mechanics and Physics of Solids 116, 99-116, 2018
On the relation of standard and helical magnetorotational instability
ON Kirillov, F Stefani
The Astrophysical Journal 712 (1), 52, 2010
A Krein space related perturbation theory for MHD α2-dynamos and resonant unfolding of diabolical points
U Günther, ON Kirillov
Journal of Physics A: Mathematical and General 39 (32), 10057, 2006
Extending the range of the inductionless magnetorotational instability
ON Kirillov, F Stefani
Physical review letters 111 (6), 061103, 2013
In-and out-of-plane vibrations of a rotating plate with frictional contact: investigations on squeal phenomena
G Spelsberg-Korspeter, D Hochlenert, ON Kirillov, P Hagedorn
Gyroscopic stabilization in the presence of nonconservative forces
ON Kirillov
Doklady Mathematics 76, 780-785, 2007
Modeling and stability analysis of an axially moving beam with frictional contact
G Spelsberg-Korspeter, ON Kirillov, P Hagedorn
Stabilization and destabilization of a circulatory system by small velocity-dependent forces
ON Kirillov, AP Seyranian
Journal of sound and vibration 283 (3-5), 781-800, 2005
A unifying picture of helical and azimuthal magnetorotational instability, and the universal significance of the liu limit
ON Kirillov, F Stefani, Y Fukumoto
The Astrophysical Journal 756 (1), 83, 2012
Collapse of the Keldysh chains and stability of continuous nonconservative systems
AP Seyranian, ON Kirillov
SIAM Journal on Applied Mathematics 64 (4), 1383-1407, 2004
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