stability of fixed points differential equations

Appl. Appl. Appl. Part of Springer Nature. Google Scholar, Czerwik, S.: Functional Equations and Inequalities in Several Variables. Fixed points are defined with the condition . 311, 139–146 (2005), Jung, S.-M.: Hyers–Ulam stability of linear differential equations of first order, II. (Please input and without independent variable , like for and for .). Let one of them to be . Lett. Bulletin of the Malaysian Mathematical Sciences Society You can switch back to the summary page for this application by clicking here. Thus one can solve many recurrence relations by rephrasing them as difference equations, and then solving the difference equation, analogously to how one solves ordinary differential equations. 54, 125–134 (2009), Takahasi, S.E., Miura, T., Miyajima, S.: On the Hyers–Ulam stability of the Banach space-valued differential equation \(y^{\prime } = \lambda y\). The point x=3.7 is an equilibrium of the differential equation, but you cannot determine its stability. 55, 17–24 (2002), MathSciNet In this paper we consider the asymptotic stability of a generalized linear neutral differential equation with variable delays by using the fixed point theory. PubMed Google Scholar. Soc. : A characterization of Hyers-Ulam stability of first order linear differential operators. Nonlinear delay di erential equations have been widely used to study the dynamics in biology, but the sta- bility of such equations are challenging. 217, 4141–4146 (2010), Article Prace Mat. 4, http://jipam.vu.edu.au, Cădariu, L., Radu, V.: On the stability of the Cauchy functional equation: a fixed point approach. Math. For this purpose, we consider the deviation of the elements of the sequence to the stationary point ¯x: zn:= xn −x¯ zn has the following property: zn+1 = xn+1 −x¯ = f(xn)− ¯x = f(¯x+zn)− ¯x. In this paper, new cri-teriaareestablished forthe asymptotic stability ofsomenonlin-ear delay di erential equations with nite … Find the fixed points, which are the roots of f 4. Note that there could be more than one fixed points. 39, 309–315 (2002), Takahasi, S.E., Takagi, H., Miura, T., Miyajima, S.: The Hyers–Ulam stability constants of first order linear differential operators. An asymptotic mean square stability theorem with a necessary and sufficient condition is proved, which improves and generalizes some results due to Burton, Zhang and Luo. Stability of Hyperbolic and Nonhyperbolic Fixed Points of One-dimensional Maps. USA 27, 222–224 (1941), Article Autonomous Equations / Stability of Equilibrium Solutions First order autonomous equations, Equilibrium solutions, Stability, Long- term behavior of solutions, direction fields, Population dynamics and logistic equations Autonomous Equation: A differential equation where the independent variable does not explicitly appear in its expression. Univ. It is different from deterministic impulsive differential equations and also it is different from stochastic differential equations. The paper is motivated by a number of difficulties encountered in the study of stability by means of Liapunov’s direct method. Lett. We linearize the original ODE under the condition . Lett. In this paper we just make a first attempt to use the fixed-point theory to deal with the stability of stochastic delay partial differential equations. 2. Anal. Equations of ﬁrst order with a single variable. J. Babes-Bolyai Math. Prace Mat. Equilibrium Points and Fixed Points Main concepts: Equilibrium points, ﬁxed points for RK methods, convergence of ﬁxed points for one-step methods Equilibrium points represent the simplest solutions to diﬀerential equations. Let one of them to be . © Maplesoft, a division of Waterloo Maple Soc. But not all fixed points are easy to attain this way. (2012), Article ID 712743, p 10. doi:10.1155/2012/712743, Cădariu, L., Radu, V.: Fixed points and the stability of Jensen’s functional equation. 19, 854–858 (2006), Jung, S.-M.: A fixed point approach to the stability of differential equations \(y^{\prime } = F(x, y)\). Jpn. Tax calculation will be finalised during checkout. [tex] x_{n + 1} = x_n [/tex] There are fixed points at x = 0 and x = 1. Bull. Birkhäuser, Boston (1998), Jung, S.-M.: Hyers–Ulam stability of linear differential equations of first order. Proc. Math. In this case there are two fixed points that are 1-periodic solutions to the differential equation. Math. Google Scholar, Hyers, D.H., Isac, G., Rassias, T.M. : Ulam stability of ordinary differential equations. 217, 4141–4146 (2010) Article MATH MathSciNet Google Scholar 6. J. Math. Two examples are also given to illustrate our results. The stability of a fixed point can be deduced from the slope of the Poincaré map at the intersection point or by computing the Floquet exponents, which is done in this Demonstration. 48. World Scientific, Singapore (2002), Găvruţa, P., Jung, S.-M., Li, Y.: Hyers–Ulam stability for second-order linear differential equations with boundary conditions. In this paper, we apply the fixed point method to investigate the Hyers–Ulam–Rassias stability of the ... Cimpean, D.S., Popa, D.: On the stability of the linear differential equation of higher order with constant coefficients. Bull. For that reason, we will pursue this avenue of investigation of a little while. 1. However, the Ackermann numbers are an example of a recurrence relation that do not map to a difference equation, much less points on the solution to a differential equation. Linearization . Electron. 8, Interscience, New York (1960), Wang, G., Zhou, M., Sun, L.: Hyers–Ulam stability of linear differential equations of first order. Sci. Let us start with equations in one variable, (1) xt +axt−1 = bt This is a ﬁrst-order diﬀerence equation because only one lag of x appears. Google Scholar, Miura, T., Jung, S.-M., Takahasi, S.E. The point x=3.7 is an unstable equilibrium of the differential equation. A Fixed-Point Approach to the Hyers–Ulam Stability of Caputo–Fabrizio Fractional Differential Equations Kui Liu 1,2, Michal Feckanˇ 3,4,* and JinRong Wang 1,5 1 Department of Mathematics, Guizhou University, Guiyang 550025, China; liuk180916@163.com (K.L. MATH https://doi.org/10.1007/s40840-014-0053-5, DOI: https://doi.org/10.1007/s40840-014-0053-5, Over 10 million scientific documents at your fingertips, Not logged in 21, 1024–1028 (2008). An asymptotic stability theorem with a necessary and sufficient condition is proved, which improves and generalizes some results due to Burton (2003) [3] , Zhang (2005) [14] , Raffoul (2004) [13] , and Jin and Luo (2008) [12] . 258, 90–96 (2003), Obłoza, M.: Hyers stability of the linear differential equation. Stability of a fixed point can be determined by eigen values of matrix . Equ. In order to analize a behaviour of solutions near fixed points, let us consider the system of ODE for . Shows how to determine the fixed points and their linear stability of a first-order nonlinear differential equation. 38, 855–865 (2015). 17, 1135–1140 (2004), Jung, S.-M.: Hyers–Ulam stability of linear differential equations of first order, III. Math. Appl. Fixed point . Math. The authors would like to express their cordial thanks to the referee for useful remarks which have improved the first version of this paper. Soon-Mo Jung. 14, 141–146 (1997), Radu, V.: The fixed point alternative and the stability of functional equations. Stability of Unbounded Differential Equations in Menger k-Normed Spaces: A Fixed Point Technique Masoumeh Madadi 1, Reza Saadati 2 and Manuel De la Sen 3,* 1 Department of Mathematics, Science and Research Branch, Islamic Azad University, Tehran 1477893855, Iran; mahnazmadadi91@yahoo.com 2 School of Mathematics, Iran University of Science and Technology, Narmak, Tehran 1684613114, … The system x' = -y, y' = -ay - x(x - .15)(x-2) results from an approximation of the Hodgkin-Huxley equations for nerve impulses. A4-2(780), Furo-cho, Chikusa-ku, Nagoya, 464-8601, Japan It has the general form of y′ = f (y). We consider the mean square asymptotic stability of a generalized linear neutral stochastic differential equation with variable delays by using the fixed point theory. If the components of the state vector x are (x1;x2;:::;xn)and the compo-nents of the rate vector f are (f1; f2;:::; fn), then the Jacobian is J = 2 6 6 6 6 6 4 ∂f1 ∂x1 ∂f1 ∂x2::: ∂f1 ∂xn Sci. Math. The investigator will get better results by using several methods than by using one of them. J. Inequal. Appl. Springer, New York (2011), Li, Y., Shen, Y.: Hyers–Ulam stability of linear differential equations of second order. Correspondence to http://www.phys.cs.is.nagoya-u.ac.jp/~nakamura/, Let us consider the following system of ODE. differential equation: x˙ = f(x )+ ∂f ∂x x (x x )+::: = ∂f ∂x x (x x )+::: (2) The partial derivative in the above equation is to be interpreted as the Jacobian matrix. Linear difference equations 2.1. (Note, when solutions are not expressed in explicit form, the solution are not listed above.) Math. Differ. This is a preview of subscription content, log in to check access. Rocznik Nauk.-Dydakt. Math. Anal. Google Scholar, Cimpean, D.S., Popa, D.: On the stability of the linear differential equation of higher order with constant coefficients. Natl. MathSciNet The fixed-point theory used in stability seems in its very early stages. Anal. Math. Google Scholar, Cădariu, L., Găvruţa, L., Găvruţa, P.: Fixed points and generalized Hyers–Ulam stability. As we did with their difference equation analogs, we will begin by co nsidering a 2x2 system of linear difference equations. Appl. MathSciNet The general method is 1. Make sure you've got an autonomous equation 2. nakamura@nagoya-u.jp We discuss the stability of solutions to a kind of scalar Liénard type equations with multiple variable delays by means of the fixed point technique under an exponentially weighted metric. Fixed Point Theory 10, 305–320 (2009), Rus, I.A. Appl. Graduate School of Information Science, Nagoya University J. : Hyers–Ulam–Rassias stability of the Banach space valued linear differential equations \(y^{\prime } = \lambda y\). S.-M. Jung was supported by Basic Science Research Program through the National Research Foundation of Korea (NRF) funded by the Ministry of Education (No. When bt = 0, the diﬀerence Solution curve starting (, ) can also diplayed with animation. Abstr. 286, 136–146 (2003), Miura, T., Miyajima, S., Takahasi, S.E. Sci. I found the Jacobian to be: [0, -1; -3x^2 + 4.3x - 0.3, -a] However, this gives me an eigenvalue of 0, and I'm not sure how to do stability here. Malays. Note that there could be more than one fixed points. Bull. Soc. Subscription will auto renew annually. The ones that are, are attractors . 5, pp. Ber. In this equation, a is a time-independent coeﬃcient and bt is the forcing term. (Note, when solutions are not expressed in explicit form, the solution are not listed above.). - 85.214.22.11. Included are most of the standard topics in 1st and 2nd order differential equations, Laplace transforms, systems of differential eqauations, series solutions as well as a brief introduction to boundary value problems, Fourier series and partial differntial equations. Rocznik Nauk.-Dydakt. Find the fixed points and classify their stability. The stability of the trajectories of this system under perturbations of its initial conditions can also be addressed using the stability theory. 2013R1A1A2005557). J. Inequal. By this work, we improve some related results from one delay to multiple variable delays. 13, 259–270 (1993), Obłoza, M.: Connections between Hyers and Lyapunov stability of the ordinary differential equations. 41, 995–1005 (2004), Miura, T., Miyajima, S., Takahasi, S.E. : A Collection of Mathematical Problems, Interscience Tracts in Pure and Applied Mathematics, Vol. when considering the stability of non -linear systems at equilibrium. In order to analize a behaviour of solutions near fixed points, let us consider the system of ODE for . Appl. This application is intended for non-commercial, non-profit use only. Math. Fixed Point Theory 4, 91–96 (2003), Rus, I.A. Learn more about Institutional subscriptions, Alsina, C., Ger, R.: On some inequalities and stability results related to the exponential function. Comput. Fixed points are defined with the condition . Contact the author for permission if you wish to use this application in for-profit activities. Abstract: Stability of stochastic differential equations (SDEs) has become a very popular theme of recent research in mathematics and its applications. Comput. The author will further use different fixed-point theorems to consider the stability of SPDEs in … In terms of the solution operator, they are the ﬁxed points of the ﬂow map. Math. Fixed points, attractors and repellers If the sequence has a limit, that limit must be a fixed point of : a value such that . Inc. 2019. Czerwik, S.: Functional Equations and Inequalities in Several Variables. Appl. The results can be generalized to larger systems. We notice that these difficulties frequently vanish when we apply fixed point theory. Anal. The point x=3.7 cannot be an equilibrium of the differential equation. Math. It contains an extensive collection of new and classical examples worked in detail and presented in an elementary manner. How to investigate stability of stationary points? (2003). The object of the present paper is to examine the Hyers-Ulam-Rassias stability and the Hyers-Ulam stability of a nonlinear Volterra integro-differential equation by using the fixed point method. Acad. Legal Notice: The copyright for this application is owned by the author(s). 346, 43–52 (2004), MATH The heat equation, for example, is a stable partial differential equation because small perturbations of initial data lead to small variations in temperature at a later time as a result of the maximum principle. Appl. 9, No. In this paper, we apply the fixed point method to investigate the Hyers–Ulam–Rassias stability of the \(n\)th order linear differential equations. Neither Maplesoft nor the author are responsible for any errors contained within and are not liable for any damages resulting from the use of this material. In this paper we begin a study of stability theory for ordinary and functional differential equations by means of fixed point theory. Here is a set of notes used by Paul Dawkins to teach his Differential Equations course at Lamar University. We are interested in the local behavior near ¯x. 2, 373–380 (1998), MATH This is the first general introduction to stability of ordinary and functional differential equations by means of fixed point techniques. Transform it into a first order equation [math]x' = f(x)[/math] if it's not already 3. 23, 306–309 (2010), Miura, T.: On the Hyers–Ulam stability of a differentiable map. Nachr. Therefore: a 2 × 2 system of differential equations can be studied as a mathematical object, and we may arrive at the conclusion that it possesses the saddle-path stability property. MathSciNet However, actual jumps do not always happen at fixed points but usually at random points. Jung, SM., Rezaei, H. A Fixed Point Approach to the Stability of Linear Differential Equations. Grazer Math. 449-457. Malays. Stability of a fixed point in a system of ODE, Yasuyuki Nakamura The solutions of random impulsive differential equations is a stochastic process. J. Korean Math. Appl. Direction field near the fixed point (, ) is displayed in the right figure. A fixed point of is stable if for every > 0 there is > 0 such that whenever , all The point x=3.7 is a semi-stable equilibrium of the differential equation. : Stability of Functional Equations in Several Variables. 4 (1) (2003), Art. Fixed Point. DIFFERENTIAL EQUATIONS VIA FIXED POINT THEORY AND APPLICATIONS MENG FAN, ZHINAN XIA AND HUAIPING ZHU ABSTRACT. For the simplisity, we consider the follwoing system of autonomous ODE with two variables. The intersection near is an unstable fixed point. Suitable for advanced undergraduates and graduate students, it contains an extensive collection of new and classical examples, all worked in detail and presented in an elementary manner. 33(2), 47–56 (2010), Jung, S.-M.: Hyers-Ulam-Rassias Stability of Functional Equations in Nonlinear Analysis, Springer Optimization and Its Applications, vol. Hi I am unsure about stability of fixed points here is an example. : Remarks on Ulam stability of the operatorial equations. 2011(80), 1–5 (2011), Hyers, D.H.: On the stability of the linear functional equation. So I found the fixed points of (0,0) (0.15,0) and (2,0). Immediate online access to all issues from 2019. When we linearize ODE near th fixed point (, ), ODE for is calculated to be as follows. This book is the first general introduction to stability of ordinary and functional differential equations by means of fixed point techniques. Math. An attractive fixed point of a function f is a fixed point x0 of f such that for any value of x in the domain that is close enough to x0, the iterated function sequence : Hyers–Ulam stability of linear differential operator with constant coefficients. This means that it is structurally able to provide a unique path to the fixed-point (the “steady- 296, 403–409 (2004), Ulam, S.M. J. Korean Math. Soc. volume 38, pages855–865(2015)Cite this article. https://doi.org/10.1007/s40840-014-0053-5. © 2020 Springer Nature Switzerland AG. 2006 edition. In general when talking about difference equations and whether a fixed point is stable or unstable, does this refer to points in a neighbourhood of those points? In mathematics, stability theory addresses the stability of solutions of differential equations and of trajectories of dynamical systems under small perturbations of initial conditions. ); jrwang@gzu.edu.cn (J.W.) Sci. Lett. Stud. Using Critical Points to determine increasing and decreasing of general solutions to differential equations. Stability, in mathematics, condition in which a slight disturbance in a system does not produce too disrupting an effect on that system.In terms of the solution of a differential equation, a function f(x) is said to be stable if any other solution of the equation that starts out sufficiently close to it when x = 0 remains close to it for succeeding values of x. |. Journal of Difference Equations and Applications: Vol. A dynamical system can be represented by a differential equation. Mathematics Section, College of Science and Technology, Hongik University, Sejong, 339-701, Republic of Korea, Department of Mathematics, College of Sciences, Yasouj University, 75914-74831, Yasouj, Iran, You can also search for this author in Consider a stationary point ¯x of the diﬀerence equation xn+1 = f(xn). Pure Appl.

stability of fixed points differential equations

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