Stability criterion for second order linear impulsive differential equations with periodic coefficients

We study the oscillation and nonoscillation for the second order linear impulsive Ž . Ž . differential equation uЉ s yp t u, where p t is an impulsive function defined by Ž . ϱ Ž . p t s Ý a ␦ t y t , and we establish a necessary and sufficient condition for Ž . oscillation or nonoscillation of th

This paper deals with a Dirichlet boundary value problem for a linear second order ordinary differential operator, whose coefficients belong to certain L p -spaces. Its solution is to be understood in the sense of Sobolev, so that the Fredholm alternative holds. The main purpose of this paper is, in

## Communicated by G. F. Roach New explicit stability conditions are derived for a linear integro-differential equation with periodic operator coefficients. The equation under consideration describes oscillations of thin-walled viscoelastic structural members driven by periodic loads. To develop s

## Abstract This paper is concerned with the problem of deciding conditions on the coefficient __q__ (__t__) and the nonlinear term __g__ (__x__) which ensure that all nontrivial solutions of the equation (__|x__ ′|^α–1^__x__ ′)′ + __q__ (__t__)__g__ (__x__) = 0, __α__ > 0, are nonoscillatory. The