UNIFORM-ULTIMATE POISSON BOUNDEDNESS OF SOLUTIONS OF P-PERTURBED SYSTEMS OF DIFFERENTIAL EQUATIONS

被引:2
作者
Lapin, Kirill S. [1 ]
Tunc, Cemil [2 ]
机构
[1] Mordovian State Pedag Inst, Fac Math & Phys, Dept Informat & Comp Engn, 11 A Studencheskaya St, Saransk 430010, Russia
[2] Van Yuzuncu Yil Univ, Fac Sci, Dept Math, 65080 Campus, Van, Turkey
来源
MISKOLC MATHEMATICAL NOTES | 2020年 / 21卷 / 02期
关键词
P-perturbed systems; differential equations; uniform-ultimate Poisson boundedness; Lyapunov function; SENSE;
D O I
10.18514/MMN.2020.3302
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
The concept of P-perturbed systems with respect to given system of ordinary differential equations is introduced. Certain sufficient conditions for uniform-ultimate Poisson boundedness of solutions of P-perturbed systems are obtained by using the method of Lyapunov functions. In conclusion, an interesting application of the above sufficient conditions to the standard closed electric RLC circuit with nonlinear elements is given.
引用
收藏
页码:959 / 967
页数:9
相关论文
共 50 条
[21]   Stability analysis and uniform ultimate boundedness control synthesis for a class of nonlinear switched difference systems [J].
Aleksandrov, Alexander ;
Chen, Yangzhou ;
Platonov, Alexey ;
Zhang, Liguo .
JOURNAL OF DIFFERENCE EQUATIONS AND APPLICATIONS, 2012, 18 (09) :1545-1561
[22]   Stability and boundedness criteria of solutions of a certain system of second order differential equations [J].
Adeyanju A.A. .
ANNALI DELL'UNIVERSITA' DI FERRARA, 2023, 69 (1) :81-93
[23]   On asymptotic equivalence of perturbed linear systems of differential and difference equations [J].
Bodine, Sigrun ;
Lutz, D. A. .
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2007, 326 (02) :1174-1189
[24]   STABILITY AND BOUNDEDNESS PROPERTIES OF SOLUTIONS TO CERTAIN FIFTH ORDER NONLINEAR DIFFERENTIAL EQUATIONS [J].
Ogundare, B. S. .
MATEMATICKI VESNIK, 2009, 61 (04) :257-268
[25]   The pth moment asymptotical ultimate boundedness of pantograph stochastic differential equations with time-varying coefficients [J].
Song, Yinfang ;
Zeng, Zhigang ;
Zhang, Tao .
APPLIED MATHEMATICS LETTERS, 2021, 121
[26]   Boundedness of the solutions of impulsive differential systems with time-varying delay [J].
Zhang, Y ;
Sun, JT .
APPLIED MATHEMATICS AND COMPUTATION, 2004, 154 (01) :279-288
[27]   Exponential ultimate boundedness of fractional-order differential systems via periodically intermittent control [J].
Xu, Liguang ;
Liu, Wen ;
Hu, Hongxiao ;
Zhou, Weisong .
NONLINEAR DYNAMICS, 2019, 96 (02) :1665-1675
[28]   Exponential ultimate boundedness of fractional-order differential systems via periodically intermittent control [J].
Liguang Xu ;
Wen Liu ;
Hongxiao Hu ;
Weisong Zhou .
Nonlinear Dynamics, 2019, 96 :1665-1675
[29]   Some remarks on the stability and boundedness of solutions of certain differential equations of fourth-order [J].
Tunc, Cemil .
COMPUTATIONAL & APPLIED MATHEMATICS, 2007, 26 (01) :1-17
[30]   Unbounded Solutions to Systems of Differential Equations at Resonance [J].
Boscaggin, A. ;
Dambrosio, W. ;
Papini, D. .
JOURNAL OF DYNAMICS AND DIFFERENTIAL EQUATIONS, 2022, 34 (01) :637-650
12345