Daniela Baran scite author profile

Daniela Baran

5Publications

12Citation Statements Received

9Citation Statements Given

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Affiliations

National Institute for Aerospace Research Elie Carafoli, National Institute of Aerospace

Publications

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On the Dynamical Systems Stability Control and Applications

Migdalovici

Baran

Vladeanu

2014

AMM

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The stability control analyzed by us, in this show, is based on our results in the domain of dynamical systems that depend of parameters. Any dynamical system can be considered as dynamical system that depends of parameters, without numerical particularization of them. All concrete dynamical systems, meted in the specialized literature, underline the property of separation between the stable and unstable zones, in sense of Liapunov, for two free parameters. This property can be also seen for one or more free parameters. Some mathematical conditions of separation between stable and unstable zones for linear dynamical systems are identified by us. For nonlinear systems, the conditions of separation may be identified using the linear system of first approximation attached to nonlinear system. A necessary condition of separation between stable and unstable zones, identified by us, is the sufficient order of differentiability or conditions of continuity for the functions that define the dynamical system. The property of stability zones separation can be used in defining the strategy of stability assurance and optimizing of the parameters, in the manner developed in the paper. The cases of dynamical systems that assure the separations of the stable and unstable zones, in your evolution, and permit the stability control, are analyzed in the paper.

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Stability Analysis of the Walking Robots Motion

Migdalovici

Vlădăreanu

Baran

et al. 2015

Procedia Computer Science

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Stability Control of Linear and Nonlinear Dynamic Systems

Migdalovici¹,

Baran²,

Vladeanu³

2016

IJAV

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The behavior of linear or nonlinear dynamic systems depends on different parameters (identifiable or free) that are involved in their definition. The stability analysis of such dynamical systems is realized by using a domain of selected free parameters. In this paper, we discuss specific theorems that concern the stability of linear dynamical systems, the stability of nonlinear dynamical systems in terms of "first linear approximations", and other stability criteria. We study the stable/unstable separation property in the free parameters domain and present a rigorous mathematical justification of this property with specific examples from various branches of science. Furthermore, we investigate specific conditions when the separation property is passed on to the nonlinear dynamical system from its first order linear approximation. The stable/unstable separation property is also emphasized as an important property of the environment that can contribute to its mathematical modeling.

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Comprehensive study of endurance for IAR-99 Hawk

Dorin¹,

Simion²,

Radu³

et al. 2014

INCAS BULLETIN

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Flutter analysis of the IAR 99 SOIM aircraft

Dorin¹,

Baran²,

Simion³

2013

INCAS BULLETIN

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Daniela Baran

On the Dynamical Systems Stability Control and Applications

Stability Analysis of the Walking Robots Motion

Stability Control of Linear and Nonlinear Dynamic Systems

Comprehensive study of endurance for IAR-99 Hawk

Flutter analysis of the IAR 99 SOIM aircraft

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