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Study of Stability in Nonlinear Neutral Differential Equations with Variable Delay Using Krasnoselskii–Burton’s Fixed Point

Mouataz Billah MESMOULI, Abdelouaheb Ardjouni, Ahcene Djoudi (2016)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

In this paper, we use a modification of Krasnoselskii’s fixed point theorem introduced by Burton (see [Burton, T. A.: Liapunov functionals, fixed points and stability by Krasnoseskii’s theorem. Nonlinear Stud., 9 (2002), 181–190.] Theorem 3) to obtain stability results of the zero solution of the totally nonlinear neutral differential equation with variable delay $x^{'} (t) = - a (t) h (x (t)) + \frac{d}{d t} Q (t, x (t - τ (t))) + G (t, x (t), x (t - τ (t))) .$ The stability of the zero solution of this eqution provided that $h (0) = Q (t, 0) = G (t, 0, 0) = 0$ . The Caratheodory condition is used for the functions $Q$ and $G$ .

Study of the limit of transmission problems in a thin layer by the sum theory of linear operators.

Angelo Favini, Rabah Labbas, Keddour Lemrabet, Stéphane Maingot (2005)

Revista Matemática Complutense

Sturmian theorems for systems of differential equations.

Chan, C.Y. (1980)

International Journal of Mathematics and Mathematical Sciences

Sturmian theory and transformations for the Riccati equation

Holmes, Mark H., Stein, F. Max (1976)

Portugaliae mathematica

Sturm-Liouville and focal higher order BVPs with singularities in phase variables.

Rachůnková, Irena, Staněk, Svatoslav (2003)

Georgian Mathematical Journal

Sturm-Liouville operator with general boundary conditions.

Gal, Ciprian G. (2005)

Electronic Journal of Differential Equations (EJDE) [electronic only]

Sturm-Liouville systems are Riesz-spectral systems

Cédric Delattre, Denis Dochain, Joseph Winkin (2003)

International Journal of Applied Mathematics and Computer Science

The class of Sturm-Liouville systems is defined. It appears to be a subclass of Riesz-spectral systems, since it is shown that the negative of a Sturm-Liouville operator is a Riesz-spectral operator on L^2(a,b) and the infinitesimal generator of a C_0-semigroup of bounded linear operators.

Sturm-Picone comparison theorem of second-order linear equations on time scales.

Zhang, Chao, Sun, Shurong (2009)

Advances in Difference Equations [electronic only]

Sturm's theorem for equations with delayed argument.

Domoshnitsky, A. (1994)

Georgian Mathematical Journal