Jacobi polynomials on the Bernstein ellipse

Abstract

In this paper, we are concerned with Jacobi polynomials Pn(α,β)(x) on the Bernstein ellipse with motivation mainly coming from recent studies of convergence rate of spectral interpolation. An explicit representation of Pn(α,β)(x) is derived in the variable of parametrization. This formula further allows us to show that the maximum value of |Pn(α,β)(z)| over the Bernstein ellipse is attained at one of the endpoints of the major axis if α+β≥ -1. For the minimum value, we are able to show that for a large class of Gegenbauer polynomials (i.e., α=β), it is attained at two endpoints of the minor axis. These results particularly extend those previously known only for some special cases. Moreover, we obtain a more refined asymptotic estimate for Jacobi polynomials on the Bernstein ellipse.