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Neutral Functional Differential Equations
1999The present chapter contains some remarks and ideas concerning application of i—smooth calculus to functional differential equations of neutral type. Taking into account essential features of neutral functional differential equations (NFDE) subsequent elaboration of these aspects requires additional investigating properties of invariant differentiable ...
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Stability Analysis of Nonlinear Neutral Functional Differential Equations
SIAM Journal on Control and Optimization, 2017Employing a system transformation, the comparison principle and the spectral properties of Metzler matrices, the authors derive some new explicit criteria for the exponential stability of general nonlinear neutral functional differential equations. The results so obtained are both delay-dependent and delay-independent criteria.
Ngoc, Pham Huu Anh, Trinh, Hieu
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Hopf Bifurcation for Implicit Neutral Functional Differential Equations
Canadian Mathematical Bulletin, 1993AbstractAn analog of the Hopf bifurcation theorem is proved for implicit neutral functional differential equations of the form F(xt, D′(xt, α), α) = 0. The proof is based on the method of S1-degree of convex-valued mappings. Examples illustrating the theorem are provided.
Kaczynski, Tomasz, Xia, Huaxing
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Rotating Waves in Neutral Partial Functional Differential Equations
Journal of Dynamics and Differential Equations, 1999The local existence and global continuation of rotating waves for partial neutral functional differential equations \[ \frac{\partial }{\partial t}D(\alpha, u_t)=d\frac{\partial^2}{\partial x^2}D(\alpha,u_t)+f(\alpha,u_t)\tag{1} \] defined on the unit circle \(x\in S^1\) is investigated; where \(d>0\) is a given constant; \(D,\;f:\mathbb{R}\times X ...
Wu, J., Xia, H.
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Stabilization of neutral functional differential equations
Journal of Optimization Theory and Applications, 1976In this paper, we prove a necessary and sufficient condition for feedback stabilization of neutral functional differential equations.
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A Neutral Functional Differential Equation of Lurie Type
SIAM Journal on Mathematical Analysis, 1980The problem of Lurie is posed for systems described by a functional differential equation of neutral type. Sufficient conditions are obtained for absolute stability for the controlled system if it is assumed that the uncontrolled plant equation is uniformly asymptotically stable. Both the direct and indirect control cases are treated.
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Generalized Hopf Bifurcation for Neutral Functional Differential Equations
International Journal of Bifurcation and Chaos, 2016Here we employ the Lyapunov–Schmidt procedure to investigate bifurcations in a general neutral functional differential equation (NFDE) when the infinitesimal generator has, for a critical value of the parameter, a pair of nonsemisimple purely imaginary eigenvalues with multiplicity [Formula: see text].
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Semigroups Generated by a Neutral Functional Differential Equation
SIAM Journal on Mathematical Analysis, 1986We discuss a number of semigroups generated by neutral functional equations of the form \[ d/dt(x(t)+\mu *x(t))+\nu *x(t)=f(t),\quad t\geq 0,\quad x(t)=\phi (t),\quad t\leq 0. \] They are of extended initial function type and of extended forcing function type, and they differ from each other by the amount of smoothness which is imposed on x and f above.
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Stability of Cubic Neutral Functional Differential Equations
IFAC Proceedings Volumes, 2004Abstract For different types of scalar cubic neutral functional differential equations (NFDEs) without linear terms delay-independent and delay —dependent conditions of asymptotic stability are established. All stability conditions are expressed directly in terms of equations coefficients.
V.R. Nosov +2 more
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Numerical Solution of Implicit Neutral Functional Differential Equations
SIAM Journal on Numerical Analysis, 1999The paper is concerned with the solution of the implicit neutral functional differential equation \[ [y(t)-g(t,y(\varphi(t)))]'=f_0(t,y(t),y(\varphi(t))),\quad t\geq t_0, \] where \(f_0,\;g\) and \(\varphi\) are given functions with \(\varphi(t)\leq t\) for \(t\geq t_0\), endowed with the initial condition \(y(t_0)=Y_0\).
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