BARÁKOVÁ, Lenka. Asymptotic properties of a three-dimensional dynamical system governing an inflation model (Asymptotic properties of a three-dimensional dynamical system governigg an inflation model). Differential Equations. Plenum Publishing Corporation, 2002, Vol. 38, No. 11, p. 1667-1668. ISSN 0012-2661.
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Basic information
Original name Asymptotic properties of a three-dimensional dynamical system governing an inflation model
Name in Czech Asymptotické vlastnosti 3-rozměrného dynamického systému popisujícího model inflace
Authors BARÁKOVÁ, Lenka (203 Czech Republic, guarantor).
Edition Differential Equations, Plenum Publishing Corporation, 2002, 0012-2661.
Other information
Original language English
Type of outcome Article in a journal
Field of Study 10101 Pure mathematics
Country of publisher Russian Federation
Confidentiality degree is not subject to a state or trade secret
Impact factor Impact factor: 0.186
RIV identification code RIV/00216224:14310/02:00031579
Organization unit Faculty of Science
Keywords in English Hopf bifurcation; limit cycle
Tags Andronov-Hopf bifurcation, Limit cycle
Changed by Changed by: doc. RNDr. Lenka Přibylová, Ph.D., učo 9607. Changed: 29/3/2010 15:24.
Abstract
Asymptotic Properties of a Three-Dimensional Dynamical System Governing an Inflation Model are studied. Conditions for global stability, positivelly invariant set and Hopf bifurcation are given.
Abstract (in Czech)
Jsou studovány asymptotické vlastnosti 3D dynamického systému popisujícího model inflace. Jsou uvedeny podmínky globální stability, pozitivně invariantní množina a Hopfova bifurkace.
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