Asymptotic behaviour of a class of nonlinear functional differential equations of third order

Consider a nonlinear di erential equation y [3] + f(t; y; y [1] ; y [2] ) = 0 in D; (1) where i] ; i = 0; 1; 2; 3 is the ith quasiderivative of y deÿned as (y [i-1] ) ; i= 1; 2; y [3] = (y [2] ) ; (2) the functions a i : R + → (0; ∞); i = 1; 2 are continuous, a 1 =a 2 has the derivative on R + a

Consider the third-order nonlinear differential equation We obtain sufficient conditions for every solution of the equation to be bounded; we also establish criteria for every solution of the equation to converge to zero.

The third-order nonlinear functional differential equations of the form are considered. We present some new oscillatory and asymptotic behavior of solutions of this equation by modifying a method given for second-order differential equations. Our results are applicable to nonlinear functional diffe