Oscillation and nonoscillation in neutral equations with integrable coefficients

The purpose of this paper is to study nonoscillations and oscillations of first order neutral equations with variable coefficients. We obtain several new existence theorems of nonoscillatory solutions and a sufficient condition for all solutions of such equations to oscillate. Our conditions are "sh

In this paper, we investigate the oscillation and nonoscillation of the neutral difference equation with variable coefficients where pn,qn, c~n (n = 0,1,2,...) are real numbers with pn >\_ 0, qn >\_ 0, cn \_> 0, k, l, and r are integers with 0 < I < k -1, r > 0, Pn -qn-k+l ~--0, and not identically

In this study, a new companion transformation is used for the neutral delay difference equation where n ∈ Z, R, P, Q are nonnegative sequences and r, k, l are positive integers. New criteria, which do not need the conditions and/or for all sufficiently large n, are introduced. All the recent resu

some necessary conditions are established for the nonoscillation of solutions of the second-order neutral delay differential equation [a(t)(r(t) +p(t)r( )) = 0. Using these results, we obtain some oscillation criteria for the above equation