Some formulas of J. Meixner

The zeros of the Meixner polynomial m n (x; ;, c) are real, distinct, and lie in (0, ). Let : n, s denote the s th zero of m n (n:; ;, c), counted from the right; and let :Ä n, s denote the sth zero of m n (n:; ;, c), counted from the left. For each fixed s, asymptotic formulas are obtained for both

## Abstract We provide short probabilistic proofs for a number of new and known real inversion formulas for the Laplace and for the Stieltjes transform.

The object of this paper is to prove combinatorially several (13 of them) limit formulas relating different families of hypergeometric orthogonal polynomials in Askey's chart classifying them. We first find a combinatorial model for Hahn polynomials which, as pointed out by Foata at the ICM (1983),

Crack growth data for 2024-T3 sheet material were analysed with different formo~as for A&, as a function fo the stress ratio R. The data covered R values from -LO to 0.54. A good correlation was obtained for AK&AK = 0.55 + 0.33R + 0.12R2. The relation between log daldn and log A& was nonlinear for h