Uniform Asymptotic Expansions for the Discrete Chebyshev Polynomials

Abstract

The discrete Chebyshev polynomials tn(x,N) are orthogonal with respect to a distribution function, which is a step function with jumps one unit at the points x=0,1,..., N-1, N being a fixed positive integer. By using a double integral representation, we derive two asymptotic expansions for tn(aN,N+1) in the double scaling limit, namely, N→∞ and n/N→ b, where b∈(0,1) and a∈(-∞,∞). One expansion involves the confluent hypergeometric function and holds uniformly for a∈[0,1/2], and the other involves the Gamma function and holds uniformly for a∈(-∞, 0). Both intervals of validity of these two expansions can be extended slightly to include a neighborhood of the origin. Asymptotic expansions for a≥1/2 can be obtained via a symmetry relation of tn(aN,N+1) with respect to a=1/2. Asymptotic formulas for small and large zeros of tn(x,N+1) are also given.