International Journal of Dynamical Systems and Differential Equations (48 papers in press)
Regular Issues
 Unique solutions for new fractional differential equations with pLaplacian and infinitepoint boundary conditions
by Li Wang, Chengbo Zhai Abstract: In this paper, we study the uniqueness and existence of solutions for a new fractional differential equation with pLaplacian and infinitepoint boundary conditions. The main method is a new fixed point theorem of $varphi(h,e)$concave operators. An example is given to illstrute the main result. Keywords: RiemannLiouville fractional derivative; pLaplacian; infinitepoint boundary value problem; $varphi(h,e)$concave operators.
 Behavior of TwoDimensional Competitive System of Nonlinear Difference Equations of Higher Order
by Jerico Bacani, Julius Fergy Rabago Abstract: We generalize the result of Mansour et. al (2012) cite{mansour} and study other related systems that deal with the dynamics of a competitive population model described by a system of nonlinear difference equations. rnMore precisely, we consider the systemrn [rn x_{n+1}=frac{x_{n(2k1)}}{varepsilon + delta x_{n(2k1)} y_{n(k1)}}, quad rn y_{n+1}=frac{y_{n(2k1)}}{rho + sigma y_{n(2k1)} x_{n(k1)}},rn ]rnwhere $varepsilon, delta, rho, sigma in {1,1}$ and $kin mathbb{N}$ with real initial conditions $(x_n)_{n=(2k1)}^0$ and $(y_n)_{n=(2k1)}^0$ rnsuch that $varepsilon + delta x_{m(2k1)} y_{m(k1)} neq 0$ and $rho + sigma y_{m(2k1)} x_{m(k1)} neq0$ for all possible values of $m$ and $k$rnand study the form and behavior of its solutions for all values of $varepsilon, delta, rho$, and $sigma$ in ${1,1}$. rnThis work also generalizes several other results on system of nonlinear difference equations (see cite{algham}, cite{elsayed5}, cite{ibrahim5}, cite{kurbanli} and cite{touafek1}).rnFurthermore, the onedimensional case of the given system provides a generalization of a series of paper of E. M. Elsayed on nonlinear diffierence equations (see cite{elsayed1}, cite{elsayed2} and cite{elsayed6}) Keywords: discrete dynamical system; nonlinear difference equation; form of solutions; convergence; periodicity; competitive system.
 Lie Symmetry Analysis and Conservation Laws of Certain Time Fractional Partial Differential Equations
by Ramajayam Sahadevan, P. Prakash Abstract: A method is presented to derive the Lie point symmetries of time fractional partial differential equations in the sense of RiemannLiouville fractional derivative. The applicability of the method has been illustrated through time fractional BurgersKortewegde Vries with time dependent variable coefficients, time fractional dissipative ZabolotskayaKhokhlov equation, time fractional generalized Benjamin equation and time fractional diffusion equation with variable coefficients. Using the obtained Lie point symmetries, it is shown that each of the above mentioned time fractional partial differential equations can be transformed into a ordinary differential equations of fractional order. Exact solutions of the above mentioned time fractional equations are derived wherever possible. It is also explained how conservation laws can be derived to time fractional partial differential equations. Keywords: Time fractional partial differential equations; Lie group formalism; conservation laws; RiemannLiouville fractional derivative; Erd$acute{e}$lyiKober fractional operators.
 Leader following speed synchronization in multiple DC motor system using a hybrid controller
by Suhaib Masroor, Chen Peng, Syed Muhammad FazalulKarim Abstract: In this paper, we explore an innovative approach to design a Chopper fed DC motor coupled as a Multiagent System (MAS), predominantly leader following MAS, to achieve consensus on speed regulated by a Hybrid controller. The hybrid controller incorporates pole placement, tracking and regulation (RST) controller accompanied by adaptive model reference adaptive control (MRAC), after that incorporating MIT rule in the design analysis to endorse system stability. Leader following algorithm is fused with the system model to make the speed of following agents equivalent to that of leader. In the proposed method, every motor with its chopper circuit is treated as sole agent ie i_th agent. In this paper, we assume that communication among leader and follower is fixed moreover, we also consider two possible scenarios of communication ie in the presence of delay and without delay. For model simulation, MATLAB is used and the obtained results endorse effectiveness of the proposed design. Keywords: Leader following MAS; Consensus; DC Chopper; DC motor; Hybrid Control.
 On Some Attractors of a TwoDimensional Quadratic Map
by Mohamed Réda Ferchichi, Abla Yousfi Abstract: In this paper, we study the appearance, evolution and neighborhood of two attractors of a dynamical system defined by a quadratic polynomial map T:R^2→R^2. The first is a Cantortype attractor located on an invariant straight line. Thus, it suffices to study the restriction of the map T to this invariant line. The second is a closed curves cycle of period 2. We show, by a numerical approach, that when a parameter of the system varies, the evolution of the orbits in the region close to this second attractor is dependent on the evolution of the stable and unstable sets (homoclinic tangency) of a saddle cycle of period 2 located in this region. Keywords: Discrete dynamical systems; attractors; Cantor sets; invariant curves; saddlenode and homoclinic bifurcations.
 Results on approximate controllability of secondorder nonautonomous integrodifferential inclusions via resolvent operators
by M. Tamil Selvan, R. Murugesu Abstract: In this work, we establish a set of sufficient conditions for the approximate controllability for a class of nonautonomous secondorder integrodifferential inclusions in Banach spaces. We establish our main results with the help of resolvent operators and BohnenblustKarlin's fixed point theorem. Then we extend our study to secondorder neutral systems with nonlocal conditions. An example is given to illustrate the main result. Keywords: Approximate controllability; Integrodifferential inclusions; Resolvent operators; Evolution equations; Nonlocal conditions.
 An Additive Separation of Variables 3D Solution to a Dynamical BVP for Neutron Cancer Therapy
by Nassar Haidar Abstract: We study the boundaryvalue problem (BVP) for irradiation of a rightrnparallelepipedal cancerous region in a (B/Gd) neutron cancer therapy (NCT)rncompositeregion setup by three mutually orthogonal, timemodulated, onespeed neutron beams. The technique of composite region coupling by a neutron source at a common boundary of different regions, that has been introduced in [1], is demonstrated to allow for an additive separation of variables (ASOV) regional neutrondensity 3D wave solution to the posing fourregional boundary value problem (BVP). The beams, which may have different pulse shapes, have different modulation frequencies and variable relative time delays. Keywords: Accelerator Based Modulated Neutron Sources; FourRegional BoundaryValuernProblems; Additive Separation of Variables; OneSpeed Neutron Diffusion; NeutronDensityrn3D Wave; Dynamical NCT; Laplace Transforms; Three Mutually Orthogonal Neutron Beams.
 Lie group analysis for heat transfer in flow of second grade fluid
by Tarik Amtout, Houda Biyadi, Mustapha ErRiani, Mustapha El Jarroudi Abstract: In this paper, the Lie symmetry analysis is performed for the heat transfer flow of a second grade fluid between two parallel heated plates. The symmetries for the coupled equations are given. The exact solutions and similarity reductions generated from the symmetry transformations are provided. Furthermore, translational symmetries were utilized to find a family of travelling wave solutions of the governing nonlinear problem. Keywords: Lie group analysis; Second grade fluid; Heat transfer flow; Similarity reduction; Travelling wave solutions.
 Lyapunovtype inequalities on fractional qdifference Schrodinger equation with the WoodsSaxon potential
by Kuikui Ma, Zhenlai Han Abstract: In this paper, the integer order Schr\"{o}dingerrnequation with the WoodsSaxon potential is extended to thernfractional $q$difference field. We establish the Lyapunovtyperninequalities for nonlinear fractional $q$difference equations, tornthe best of our knowledge, which is the first work dealing withrnLyapunovtype inequalities for nonlinear fractional $q$differencernequations. Results in this paper even are new in integer order case.rnMoreover, we further investigate the twopoint boundary valuernproblem of nonlinear fractional $q$difference Schr\"{o}dingerrnequation with the WoodsSaxon potential. By applying thernLeraySchauder degree theory, we get a sufficient condition of thernexistence of solutions that is relatively easy to verify comparedrnwith the result of existing literature. By utilizing thernLeggettWilliams fixed point theorem, an inequality is added to thernexistence condition of solutions of such problem studied in thernexisting literature, and we get the multiplicity of solutions ofrnthis problem. As applications, two examples are presented tornillustrate our main results. Keywords: Fractional $q$difference equations; Lyapunov inequality; Boundary value problem.
 Global Dynamics of a Cancer Stem Cell Treatment Model
by Kristen Abernathy, Zachary Abernathy, Robert DoughertyBliss, Caleb Mayer, Heidi Whiteside Abstract: We provide global stability arguments for a cancer treatment model with chemotherapy and radiotherapy that accounts for the cancer stem cell hypothesis. Employing the method of localization of compact invariant sets, we resolve the global dynamics of the notreatment, constant radiation, and combination chemotherapy and radiotherapy cases. In our analysis of the combination treatment model, we show that the presence of a chemotherapy agent lowers the required radiation strength for a globally asymptotically stable cure state. Keywords: cancer stem cells; global stability; cancer treatment; localization of compact invariant sets.
 Population Dynamic Caused by War Involvement via Fractional Derivative on Time Scales
by Mehdi Nategh, Dumitru Baleanu, Abdolali Neamaty, Bahram Agheli Abstract: In this work, a fractional derivative on time scales is discussed. Then by suggesting a new structure on the real line, we extend the objectivity of this derivative. A population dynamic problem caused by a confrontation or invasion is mentioned together with a model which led us to a nonhomogeneous second order fractional PDE on time scales. Keywords: Time scales; Fractional dynamics; Population dynamic problem; War involvement.
 Front transition in higher order diffusion equations with a general reaction nonlinearity
by Samir Shamseldeen Abstract: In this paper, we investigate the wave front solutions of a class of higher order reactiondiffusion equations with a general reaction nonlinearity. Linear stability analysis with a modulated traveling wave perturbation is used to prove the existence of wave front solutions. We proved that the studied equation supports both monotonic translating front and patterned front solutions. Also, a minimal front speed and the condition for a transition between these front types (monotonic and patterned) are determined. Two numerical examples are discussed (the extended FisherKolmogorov equation with two different reaction nonlinearities) to support the obtained results. Keywords: reactiondiffusion equations; traveling waves; Minimal front speed; pulled fronts.
 Role of harvesting in controlling chaos and disease propagation in predatorprey system with disease in prey
by Prodip Roy, Krishna Pada Das, Partha Karmakar, Seema Sarkar (Mondal) Abstract: The paper explores an ecoepidemiological model with harvesting in the species and the disease is circulating in the prey population. The curiosity of this paper is to consider the role of harvesting on chaotic dynamics. We perform the local and global stability analysis of the equilibrium points and the Hopf bifurcation analysis around the interior equilibrium point. Further we pay attention to the direction of Hopf Bifurcation. Our numerical simulations reveal that the three species ecoepidemiological system shows chaos in low level of infection. It is observed that when force of infection increases chaos becomes stable. We conclude that chaotic dynamics can be controlled by the harvesting parameter as well as the force of infection. We apply basic tools of nonlinear dynamics such as Poincare section and maximum Lyapunov exponent to identify chaotic behavior of the system. Keywords: Disease in prey; stable; permanence; impermanence; chaos; Lyapunov exponent.
 Disappearance of limit cycle oscillations in a predatorprey model: role of mortality due to predation of infected prey
by Krishna Pada Das, Subhabrata Ghosh, Somnath Maiti Abstract: This present work establishes an ecoepidemiological model byrnthree element, namely a susceptible prey,an infected prey and predarntor.In this situation the prey population shows its migratory nature.rnIt is observed in real life situation that a predator dies due to predarntion of an infected prey or they can even survive after consumptionrnof an infected one. We make a general consideration on the growth ofrnthe predator population by consuming the infected prey population.rnWe found that if the predation of the infected prey has a negativerneffect on the growth of the predator population, then the predatorsrnmay be washed away from the system but it will survive if the intakernof the infected prey has a positive effect which boost up its growth.rnWe found specific conditions under the influence of predational effectsrnfor the stability of the system around the coexistence of steady state.rnHopfbifurcation and persistence conditions are also worked out. We observe that simultaneously with an increase in the degree of infectionrnthe system loses its stability and indicate limit cycle oscillation. Wernobserve that the oscillatory coexistence of the species disappears andrnthe system reaches its steady state position regulated by the converrnsion efficiency of the predator. Finally we perform extensive numericalrnsimulations to establish our analytical approach. Keywords: Disease in prey; Malthus growth; non positive restricted parameter;rnstability; Hopfbifurcation; permanence.
 First order fifth degree Fuchs differential equation with fixed critical points
by Khaled M'hamedmessaoud, Toufik Laadj, Arezki Kessi Abstract: In this paper, we are interested in studying the nonlinear differential equations of order one and fifth degree, whose general integral is uniform. We will give sufficient conditions, for the considered equations to be with fixed critical points. Keywords: Fuchs differential equations; fixed critical points; painlevé property. DOI: 10.1504/IJDSDE.2019.10013708
 On the global existence of solutions to a class of semilinear fractional order system with delay
by Mengrui Xu, Shurong Sun Abstract: In this paper, we supplement the global existence of solutions to a class of
nonlinear fractional order system with time delay by using the LeraySchauder fixed point
theorem, and improve conditions to make the estimate value of the above solution hold. An
example as an application of our results is also given. Keywords: Fractional differential system; Initial value problem; Delay; Existence.
 Permanence and extinction for a stochastic twospecies competitive system
by Yizhong Liu Abstract: This paper deals with a stochastic twospecies competitive system. Some very verifiable
criteria on the uniformly weakly persistent in the mean almost surely (a.s.) and extinction for each species are obtained. Some examples are given to illustrate our main theoretical findings. Our results are new and complement previously known results. Keywords: Stochastic Competitive model; Permanence;rnExtinction; Time delay.
 Existence and multiplicity of solutions for the fractional Schr
by Peiluan Li Abstract: In the present paper, we investigate the solutions of a fractional Schr Keywords: Fractional Schrodinger equations; Steep potential well; Infinitely many solutions.
 An Antiplane ElectroElastic Contact Problem: Case Regularized Friction Law
by Mohamed Dalah Abstract: In this paper, we study an antiplane electroelastic contact problem with regularized friction law. We suppose that the material is assumed to be electroelastic and the foundation is assumed to be electrically conductive. In the first step, we write the mathematical model and its wellposedness. In the second step, we try to give the variational formulation and main results. Finally, we prove that the weak solution of the antiplane electroelastic contact problem with regularized friction law is converge to the weak solution of problem P in [3] when the parameter of regularization $rho$ is very small. Keywords: Regularized friction law; Antiplane; Friction law; Variational formulation; Variational inequality; Weak solution.
 Intrinsic growth rates influence on the net economic rents of fishermen
by Meriem BENTOUNSI, Imane AGMOUR, Naceur ACHTAICH, Youssef EL FOUTAYENI Abstract: In this paper, a mathematical model consisting of Sardina pilchardus, Xiphias gladius and Bluefin tuna is considered. The differential system is based on the LotkaVolterra scheme, considering a logistic growth for each population. Biological and bioeconomic equilibria of the system are obtained, and criteria for local stability and instability of the system are derived. This work is an attempt to study the effect of intrinsic growth coefficients changes on the net economic rents of several fishermen exploiting the three marine populations in the Atlantic coast of Morocco based on the parameters given by INRH (Institut National de Recherche Halieutique). To achieve this objective, we have to study the bioeconomic model. Numerical simulations are given to support the theoretical results. Keywords: Bioeconomic model; intrinsic growth coefficients; Stability analysis; Net economic rent; Generalized Nash equilibrium problem.
 Some Oscillation Theorems for Generalized Lienard Type System
by Tohid Kasbi, Vahid Roomi, Aliasghar Jodayree Akbarfam Abstract: In this work a generalized Li Keywords: Oscillation; Liénard system; Differential Equations.
 AXISYMMETRIC THERMOELASTIC STRESS ANALYSIS OF A THIN CIRCULAR PLATE DUE TO HEAT GENERATION
by Kishor Gaikwad Abstract: The aim of this work is to determine the temperature, displacement function, thermal stresses and thermal deflection of a thin circular plate defined as
0 r a, 0 z h under an unsteady temperature field due to internal heat generation within it. Initially, the plate is kept at an arbitrary temperature F(r, z). For times t > 0, heat is generated within the thin circular plate at a rate of g(r, z, t) W.m−3. The governing heat conduction equation has been solved by generalized finite Fourier transform and finite Hankel transform technique. The results are obtained in a series form in terms of Bessels functions. The results for temperature, displacement function, thermal stresses and thermal deflection have been computed numerically and are illustrated graphically. Keywords: Inverse thermoelastic problem; Thermal deflection; Circular plate; Heat
generation; Thermal stresses; Axisymmetric.
 MULTIPLE PERIODIC SOLUTIONS FOR SECOND ORDER IMPULSIVE DELAY DIFFERENTIAL EQUATIONS
by Fatima Dib, Naima DaoudiMerzagui Abstract: In this paper we discuss the existence of periodic solutions for an impulsive nonautonomous second order delay differential equation. We obtain multiple periodic solutions by a variational approach. Keywords: Second order delay differential equation; periodic solution; impulses; mountain pass theorem.
 ERGODIC SHADOWING OF NONAUTONOMOUS DISCRETETIME DYNAMICAL SYSTEMS
by Hadi Parham, Fateme Helen Ghane, Esmaeel Rezaali Abstract: The present work is concerned with the ergodic shadowing property of nonautonomous discretetime dynamical systems. The concept of the ergodic shadowing was introduced by Fakhari and Ghane (2010) for a continuous onto map. Here, we will generalize the notion of ergodic shadowing to nonautonomous discretetime dynamical systems. We show that
every uniformly equicontinuous nonautonomous discretetime system with the ordinary shadowing and topologically mixing properties enjoys the ergodic shadowing property. Moreover, we define some kind of specification property and investigate its relation to the ergodic shadowing property. Finally, we prove that every uniformly expanding nonautonomous discretetime system satisfies the ergodic shadowing property. Keywords: nonautonomous dynamical systems; ergodic shadowing; pseudo orbital pecification.
 Global exponential convergence of CNNs with multiproportional delays and leakage delays
by Changjin Xu Abstract: In this article, we deal with cellular neural networks (CNNs) with multiproportional delays
and leakage delays. Applying the differential inequality techniques, a new sufficient criterion which ensures the global exponential convergence of CNNs with multiproportional delays and leakage delays is obtained. Numerical simulations are given to illustrate the obtained results. The theoretical predictions of this article are novel and complement some earlier publications. Keywords: Cellular neural networks; Leakage delay; Exponential convergence;rnProportional delay.
 Multivariate vector sampling expansion in shiftinvariant subspaces
by Qingyue Zhang Abstract: Sampling theorems on a shiftinvariant subspace are having a significant impact, since they avoid most of the problems associated with classical Shannon's theory. Vector sampling theorems on a shiftinvariant subspace which are motivated by applications in multichannel deconvolution and multisource separation are active field of study. In this paper, we consider vector sampling theorems on a multivariate vector shiftinvariant subspace. We give a multivariate vector sampling expansion on a multivariate vector shiftinvariant subspace. Some equivalence conditions for the multivariate vector sampling expansion to hold are given. We also give several examples to illustrate the main result. Keywords: sampling theorems; vector sampling theorems; shiftinvariant subspaces; super Hilbert space; frames.
 On invariant analysis, group classification and conservation laws of two component Novikov equation}
by Manjit Singh Abstract: The twocomponent Novikov equation is investigated for group classification and nontrivial local conservation laws. In addition to Lie group analysis, the existing classification of 4dimensional Lie algebra is used to improve the classifications of Lie algebra of Novikov equations. Apart from this, the direct method is used in the construction of conservation laws using multipliers. Keywords: Lie symmetries; Group classifications; Conservation laws.
 A Convergence Computational Scheme for System of Integral Equation Using Finite Element Method
by Hamed Zeidabadi, Mohammad Heidari Abstract: In this paper, a computational scheme for extracting approximate solutions
of system of integral equations is proposed. For this purpose, by considering the variational form of the problem and using finite element method, the system of integral equations are reduced to a system of algebraic equations, that are solved by an efficient algorithm. Also, the existence and uniqueness of the system of integral equations are illustrated and the convergence of the approximate solution to the exact solution is investigated. Finally, the effectiveness of the proposed method is discussed by comparing with the results of the given approaches in Babolian et al. [1] and Jafarian et al. [2]. Keywords: System of Volterra Integral Equation; Finite Element Method; Existence; Uniqueness.
 Approximate Controllability of Hilfer Fractional Sobolev Type Integrodifferential Inclusions with Nonlocal Conditions
by JinRong Wang Abstract: In this paper, we investigate approximate controllability of Hilfer fractional Sobolev type differential inclusions with nonlocal conditions. The main techniques rely on the fixed point theorem combined with the semigroup theory, fractional calculus, and multivalued analysis. An interesting example is provided to illustrate the obtained results. Keywords: Approximate controllability; Hilfer fractional derivative; Sobolev type differential inclusions; Semigroup theory.
 ON ERGODICITY OF MARKOVIAN MOSTLY EXPANDING SEMIGROUP ACTIONS
by Azam Ehsani, Fateme Helen Ghane, Marzie Zaj Abstract: We consider finitely generated semigroup actions on a compact manifold and
discuss their ergodic properties.
We introduce Markovian mostly expanding semigroups
and show that each $C^{1+\alpha}$ Markovian mostly expanding semigroup action is ergodic (with respect to the Lebesgue measure) whenever it is strongly transitive.
Moreover, it is proved that each Markovian mostly expanding semigroup is non uniformly expanding. Our approach provides a large class of nonuniformly expanding semigroups. Keywords: finitely generated semigroup action; backward minimality; strong transitivity; ergodicity of semigroup actions; nonuniformly expanding property.
 Harvesting in tritrophic food chain stabilizes the chaotic dynamicsconclusion drawn from Hastings and Powell model
by Binayak Nath, Krishna Pada Das Abstract: The paper explores a tritrophic food chain model with harvesting in the species. The curiosity of this paper is to observe chaotic dynamics and its control. We perform the local stability analysis of the equilibrium points.
The Hopf bifurcation analysis and global stability around the interior equilibrium point are also performed. Our numerical simulations reveal that the three species food chain model induces chaos from perioddoubling, limit cycle and stable focus for increasing values of half saturation constant. We conclude
that chaotic dynamics can be controlled by the harvesting parameter. We apply basic tools of nonlinear dynamics such as Poincare section and Lyapunov exponent
to identify chaotic behavior of the system. Keywords: Harvesting; Chaos; stable focus; Poincare map; Lyapunov exponent; persistence; Hopf bifurcation.
 Rough center in a 3dimensional LotkaVolterra system
by Yusen Wu Abstract: This paper identifies rough center for a LotkaVolterra system, a 3dimensional quadratic polynomial differential system with four parameters $h,n,lambda,mu$. The known work shows the appearance of four limit cycles, but the center condition is not determined. In this paper, we verify the existence of at least four limit cycles in the positive equilibrium due to Hopf bifurcations by computing normal forms. Furthermore, applying algorithms of computational commutative algebra we find Darboux polynomial and give a center manifold in closed form globally, showing that the positive equilibrium of centerfocus is actually a rough center on a center manifold. Keywords: Rough center; 3dimensional LotkaVolterra system; Normal form theory.
 LyapunovType Inequalities for mpoint fractional boundary value problem
by Rabiaa Aouafi, Nacer Adjeroud Abstract: In this work, we establish some Lyapunovtype inequalities for the fractional boundary value problem of higher order under multipoint boundary conditions. In order to illustrate the results, we provide numerical example and we use this inequality to obtain an interval where linear combinations of certain MettagLeffler functions have no real zeros. Keywords: Fractional differential equation; Caputo's fractional derivative; Lyapunov inequalities; multipoint; MittagLeffler function.
 Existence and uniqueness of (w,c)periodic solutions of semilinear evolution equations
by Makrina Agaoglou, Michal Feckan, Angeliki Panagiotidou Abstract: In this work we study the existence and uniqueness of (o; c)periodicrnsolutions for semilinear evolution equations in complex Banach spaces. Keywords: (w,c)periodic solutions; semilinear evolution equations; nonresonance conditions.
 Diagnosis of timedelay fractional systems using observerbased methods
by Halima Atitallah, Asma Aribi, Mohamed Aoun Abstract: In this paper, two modelbased methods are considered for the diagnosis of timedelay fractional systems. Timedelay fractional Luenberger observer without unknown input and timedelay fractional unknown input observer are developed and used for fault detection and isolation. A singleobserver scheme is needed for fault detection and a bank of generalized (respectively dedicated) observers is required for fault isolation. A theoretical study investigating the convergence condition for each observerbased method in terms of matrix inequalities is presented. Residual sensitivities to faults and to disturbances are studied. Timedelay fractional unknown input observer parameters are computed to obtain structured residuals. This observer ensures unknown input decoupling from the state which results residual insensitive to unknown inputs. Two numerical examples to validate the efficiency of the proposed approaches for diagnosis of timedelay fractional systems are given. Example 1 illustrates the efficiency of the two observers in fault detection and the difference between them in unknown input influence. Example 2 illustrates the efficiency of the proposed approach for fault isolation. Keywords: Luenberger observer; unknown input observer; diagnosis; timedelay fractional system; fault detection; fault isolation.
 Existence of multiple positive solutions for nonlinear threepoint RiemannLiouville fractional differential equation
by Yunhong Li, Weihua Jiang Abstract: In this article, the existence of multiple positive solutions is considered for nonlinear threepoint RiemannLiouville fractional differential equation. We use the AveryPeterson fixed point theorem to acquire the existence of multiple positive solutions for the boundary value problem. An example is also presented to illustrate the effectiveness of the main result. Keywords: RiemannLiouville fractional derivative; positive solutions; AveryPeterson fixed point theorem.
 Nonuniqueness of solution for initial value problem of impulsive CaputoKatugampola fractional differential equations
by Xianmin Zhang Abstract: In this paper, the nonuniqueness of solution is mainly considered to the initial value problem (IVP) for the system of impulsive fractional differential equations (IFrDE) with CaputoKatugampola derivative. The IVP for IFrDE with Caputo Katugampola derivative is equivalent to the integral equations with an arbitrary constant, which means that the solution is nonunique. Finally, a numerical example is provided to show the main result. Keywords: fractional differential equation; impulsive fractional differential equation; impulse; CaputoKatugampola derivative.
 Time feedback control in a modified Sprott E model
by Yizhong Liu Abstract: This paper is concerned with chaos control for a modified Sprott E system.rn Applying timedelayed feedback control method, we establish some new conditions to control chaotic behavior of modified Sprott E system.rn With the aid of local stability analysis, we theoretically provern the occurrences of Hopf bifurcation.rn Computer simulations are implemented to support analytical results. Finally,rn a brief conclusion is included. Keywords: Modified Sprott E system; Chaos; Stability; Hopf bifurcation; Timedelayed feedback.
 Oscillation of one kind of second order neutral delay differential equations
by Hui Li, Yige Zhao, Shurong Sun Abstract: This paper is dedicated to discussing the oscillation of the second order neutral delay differential equations $$ left(r(t)(z'(t))^alpharight)'+q(t)f(x^beta(sigma(t)))=0, $$ where $z(t)=x(t)+p(t)x(tau(t)).$ Sufficient conditions are provided by Riccati transformation comparing with related first order differential inequalities and differential equations. Results obtained in this paper have extended and improved conclusions contained in other literatures. Several illustrative examples are presented. Keywords: Oscillation; Neutral; Delay; Differential equation.
 Effects of Computer Networks' Viruses under the Influence of Removable Devices
by Ashraf Ahmad, Yousef Abu Hour, Mahmoud DarAssi Abstract: The Removable devices (RD) is one of the important factors that affects the virus spreading. We assumed that the infected RD could affect the nodes of $S$ and $E$ compartments at the rates, $\theta_1$ and $\theta_2,$ respectively. While the previous studies considered this effect on susceptible compartment only. {Moreover, we considered the effect of the rate of the nodes which are break down from network because of infected RD, $\mu_1 $.} This model has no virusfree equilibrium and has a unique endemic equilibrium. The theorems of asymptotically autonomous systems and the generalized PoincareBendixson are used to show that the endemic equilibrium is globally asymptotically stable. Numerical methods are used to solve the obtained system of differential equations and the solutions are illustrated in several examples. The effects of $\xi, \, \epsilon,\, \theta_1 $ and $\theta_2$ rates on the devices that moved from latent to recovered nodes are investigated. The behavior of the susceptible, exposed and infected nodes in the computer network have been analyzed. Keywords: Epidemiology; Modeling; Computer virus spread; Equilibrium; Infected Removable Devices.
 Coexistence of Three Limit Cycles for a Septic Polynomial Differential Systems
by Mohamed GRAZEM, Ahmed BENDJEDDOU, Rachid CHEURFA Abstract: The existence of limit cycles is interesting and very important in applications. It is a key to understand the dynamic of polynomial differential systems. The aim of this paper is to investigate a class of planar differential systems of degree seven. Under some suitable conditions, the existence of three limit cycles two of them are nonalgebraic while the third is algebraic is proved. Furthermore, these limit cycles are explicitly given in polar coordinates. Some examples are presented in order to illustrate the applicability of our results. Keywords: Planar polynomial differential system; First integral; Periodic orbits; algebraic and nonalgebraic limit cycle.
 Approximate controllability results for neutral stochastic integrodifferential equations of Sobolev type with unbounded delay via resolvent operators
by Nirmalkumar Rajendran, Murugesu Rangasamy Abstract: In this paper, we consider a class of approximate controllablility of stochastic integrodifferential equations of Sobolev type with unbounded delay via resolvent operators. Using the stochastic analysis technique and fixed point theorem, a set of sufficient conditions is obtained for the required result of approximate controllability of stochastic integrodifferential equations of Sobolev type with unbounded delay. Finally, an example is provided to illustrate the obtained result. Keywords: Approximate Controllability; Fixed point theorem; Stochastic differential equation; Mild solution.
 Simulation of large deflections of a flexible cantilever beam fabricated from functionally graded materials by the Adomian decomposition method
by Randolph Rach, JunSheng Duan, AbdulMajid Wazwaz Abstract: In this work, we use the Adomian decomposition method to study large deflections of a flexible cantilever beam fabricated from functionally graded materials with a sinusoidal nonlinearity. We convert the specified nonlinear boundary value problem with Dirichlet and Neumann boundary conditions, that governs the large deflections, to an equivalent nonlinear FredholmVolterra integral equation. We illustrate the obtained approximations by appropriate graphs and examine the resulting possible errors. Finally, we discuss the relationship of the deflection and the model parameters. Keywords: large deflection; boundary value problem; flexible cantilever beam; functionally graded material; Adomian decomposition method; Adomian polynomials.
 Global existence and blow up of positive initial energy solution of a quasilinear wave equation with nonlinear damping and source terms
by Paul Ogbiyele Abstract: In this paper, we consider a quasilinear wave equation having nonlinear damping and source terms $$ u_{tt}  \Delta u_t  \sum^N_{i=1} \frac{\partial}{\partial x_i} \Bigl[\sigma_i(x , u_{x_i}) + \beta_i(x , u_{tx_i }) \Bigr] + f(x , u_t) = g(x , u) $$ and obtained global existence and blow up results under certain polynomial growth conditions on the nonlinear functions $\sigma_i,; \beta_i, (i= 1, 2, ..., N)$, $f$ and $g$. We obtain global existence result for positive initial energy solution using Galerkin approximation procedure and nonexistence(blow up) result using the technique introduced by Georgiev and Todorova cite{GT} with little modification for our problem. Keywords: Galerkin approximation procedure; Global solution; Blow up; Potential well.
 4dimensional zeroHopf bifurcation for polynomial differentials systems with cubic homogeneous nonlinearities via averaging theory
by Amina Feddaoui, Jaume Llibre, Amar Makhlouf Abstract: The averaging theory of second order shows that for polynomial differential systems in R^4 with cubic homogeneous nonlinearities at least nine limit cycles can be born in a zeroHopf bifurcation. Keywords: Hopf bifurcation; averaging theory; cubic polynomial differential systems;.
 Bifurcation behavior of a nonlinear innovation diffusion model with external influences
by Rakesh Kumar, Anuj Sharma, Kulbhushan Agnihotri Abstract: A nonlinear form of Bass model for innovation diffusion consisting of two differential equations governed by two variables viz. for adopters and nonadopters population densities is proposed to lay stress on the evaluation period. By investigating the corresponding characteristic equation, the local stability of a positive equilibrium and the existence of Hopf bifurcation are demonstrated by analyzing the associated characteristic equation. The critical value of evaluation period is determined beyond which small amplitude oscillations of the adopter and nonadopters population occur, and this critical value goes on decreasing with the increase in carrying capacity of the nonadopters population. Basic results are derived to determine the direction of bifurcations and the stability of bifurcating periodic solutions by using the normal form theory and center manifold theorem. Sensitivity analysis is performed for state variables at positive steady state on model parameters. It is observed that the cumulative density of external influences has a significant role in developing the maturity stage (final adoption stage) in the system. Numerical computations are executed to confirm the correctness of theoretical investigations. Keywords: Innovation diffusion model; Stability analysis; Sensitivity analysis; Hopf bifurcation; Center manifold theorem; Normal form theory.
 SEMIGROUP DYNAMICS FOR FLIGHT VECTORS
by Robert OBrien Abstract: A commutative semigroup of contractions S on a Hilbert space, H, has a natural order and net structure which deﬁnes stability, system dynamics, and α and ω limits for the ﬂight vectors H0. The space of pure ﬂight vectors (no weakly stable components) are spanned by the ω limits of weaklywandering vectors which are weakly Poisson recurrent. The result H0 splits: H0 = Hm ⊕Hw, Hw the weakly stable subspace and Hm the weakly Poisson recurrent space. Hm = ⊕M(xτ,S) where M(xτ,S) is the closed subspace spanned by the weak limit points of xτ, {xτ} an orthonormal set of weaklywandering vectors in Hm. Two examples illustrate the results. Keywords: Hilbert Space; Recurrence; Flight Vectors; Dynamical System; Weakly Wandering; Almost Weakly Stable; Unitary; Weak Stability; Contraction; Semigroup.
 Parameter Estimation for ChanKaroliLongstaffSaunders Model Driven by Small Levy Noises from Discrete Observations
by Chao Wei Abstract: This paper is concerned with the parameter estimation problem for discrete observed ChanKaroliLongstaffSaunders model driven by small L'{e}vy noises. The explicit formula of the least squares estimators are obtained and the estimation error is given. By using CauchySchwarz inequality, Gronwall's inequality, Markov inequality and dominated convergence, the consistency of the least squares estimators are proved when a small dispersion coefficient $varepsilonrightarrow 0$ and $nrightarrowinfty$ simultaneously. The simulation is made to verify the effectiveness of the estimators. Keywords: Least squares estimator; L'{e}vy noises; discrete observations; consistency.
