A nonoscillation theorem for a second order sublinear retarded differential equation

A RESEARCH NOTE ON THE SECOND ORDER DIFFERENTIAL EQUATION

Let U(t, ) be solution of the Dirichlet problem y''+( t-q(t))y= 0 - 1 t l y(-l)= 0 = y(x), with variabIe t on (-1, x), for fixed x, which satisfies the initial condition U(-1, )=0 , (-1, )=1. In this paper, the asymptotic representation of the corresponding eigenfunctions of the eigen values has been investigated . Furthermore, the leading term of the asymptotic formula for ...

On Fuzzy Solution for Exact Second Order Fuzzy Differential Equation

In the present paper, the analytical solution for an exact second order fuzzy initial value problem under generalized Hukuhara differentiability is obtained. First the solution of first order linear fuzzy differential equation under generalized Hukuhara differentiability is investigated using integration factor methods in two cases. The second based on the type of generalized Hukuhara different...

Oscillation and Nonoscillation Criteria for Second-order Linear Differential Equations

Sufficient conditions for oscillation and nonoscillation of second-order linear equations are established. 1. Statement of the Problem and Formulation of Basic Results Consider the differential equation u′′ + p(t)u = 0, (1) where p : [0, +∞[→ [0, +∞[ is an integrable function. By a solution of equation (1) is understood a function u : [0,+∞[→] − ∞, +∞[ which is locally absolutely continuous tog...

A method for solving first order fuzzy differential equation

Nonoscillation criteria for second-order nonlinear differential equations

Consider the second order nonlinear differential equations with damping term and oscillation’s nature of ( ( ) '( )) ' ( ) '( ) ( ) ( ( )) ( '( )) 0 r t x t p t x t q t f x t k x t    0 t t  (1) to used oscillatory solutions of differential equations ( ( ) '( )) ' ( ) ( ( )) ( '( )) 0 t x t t f x t k x t     (2) where ( ) t  and ( ) t  satisfy conditions given in this work paper. Our ...