On approximation of ultraspherical polynomials in the oscillatory region

Abstract

For k 2 even, and α -(2k+1)/4 , we provide a uniform approximation of the ultraspherical polynomials Pk(α,\, α)(x) in the oscillatory region with a very explicit error term. In fact, our result covers all α for which the expression "oscillatory region" makes sense. We show that there the function g(x)=c b(x) \, (1-x2)(α+1)/2 Pk(α, α)(x)= B(x)+ r(x), where c=c(k, α) is defined by the normalization, B(x)=∫0 x b(x) dx, and the functions c,\, b(x), \, B(x), as well as bounds on the error term r(x) are given by some rather simple elementary functions.