Second order difference equations for certain families of ‘discrete’ polynomials

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 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

We derive the fourth-order difference equation satisfied by the associated order r of classical orthogonal polynomials of a discrete variable. The coefficients of this equation are given in terms of the polynomials a and z which appear in the discrete Pearson equation A(ap)= zp defining the weight

## +1 and a(a.a=.) = q.l(x.+1), where an > 0, qn > 0, and I : It --\* It is continuous with u.f(u) > 0 for u ~ 0. They obtain necessary and sufficient conditions for the asymptotic behavior of certain types of nonoscilhtory solutions of (\*) and sufficient conditions for the asymptotic behavior o