Summation averages and the oscillation of second-order nonlinear difference equations

we present some criteria for the oscillation of the second-order nonlinear differential equation [a(+Sr(t))z'(t)] + z#)z'(t) + &)f(z(t)) = 0, t L to > 0, where a E C'( [to, 00)) is a,nonnegative function, q E C( [to, 00)) are allowed to change sign on [to, co), @, f E C'(B;R), $(z) > 0, zf(z) > 0, f

The purpose of this paper is to present some new sufficient criteria for the oscillation of all solutions of the second-order nonlinear differential equation where a E CZ([to, ¢~)) is a positive function, q 6 C([to, c~)) has no restriction on its sign, ~ E C(R), I 6 CI(R) are such that if(x) ~ 0 an

In this paper we consider the second order nonlinear difference equation Ä 4 nondecreasing, and uf u ) 0 as u / 0, q is a real sequence. Some new n Ž . sufficient conditions for the oscillation of all solutions of 1 are obtained.

In this paper, discrete inequalities are used to offer sufficient conditions for oscillation of all solutions of second-order nonlinear difference equations with alternating coefficients. @ 2000 Elsevier Science Ltd. All rights reserved.

In this paper discrete inequalities are used to offer sufficient conditions for the oscillation of all solutions of the difference equation Ž . n n n q 1 n q 1 n where 0 -s prq with p, q odd integers, or p even and q odd integers. Several examples which dwell upon the importance of our results are