
Accession Number : AD0613066
Title : EXISTENCE, UNIQUENESS, AND STABILITY FOR NONLINEAR DIFFERENTIALDIFFERENCE EQUATIONS IN THE NEUTRAL CASE.
Descriptive Note : Technical rept.,
Corporate Author : NEW YORK UNIV N Y COURANT INST OF MATHEMATICAL SCIENCES
Personal Author(s) : Snow,Wolfe
Report Date : FEB 1965
Pagination or Media Count : 57
Abstract : For ordinary differential equations it is well known that an equilibrium solution is stable if the linearized equation has only exponentially decaying solutions. The differentialdifference equation u' (t+s)  u' (t) + au (t + )s) = g (t, u (t), u (t+ s)), a > O, s > O, when linearized, also has decaying exponentials exp (st), but the characteristic roots s approach the imaginary axis. The problem arises  do solutions of this equation decay. An affirmative answer is obtained for this problem, the rate of decay depending upon the smoothness of the initial data and nonlinear term and the rate of approach of the characteristic roots to the imaginary axis. Then this result is applied to a transmission line problem. Also, an example is given of a homogeneous linear ordinary differentialdifference equation with constant coefficients, whose characteristic roots all lie in the left half plane, having an unbounded solution. (Author)
Descriptors : (*NONLINEAR DIFFERENTIAL EQUATIONS, DIFFERENCE EQUATIONS), (*DIFFERENCE EQUATIONS, NONLINEAR DIFFERENTIAL EQUATIONS), INTEGRAL TRANSFORMS, TRANSCENDENTAL FUNCTIONS, TRANSMISSION LINES, INTEGRALS
Distribution Statement : APPROVED FOR PUBLIC RELEASE