Inequalities for zeros of Jacobi polynomials via Sturm’s theorem: Gautschi’s conjectures

Abstract

Let \(x_{n,k}^{(\alpha ,\beta )}\), \(k=1,\ldots ,n\), be the zeros of Jacobi polynomials \(P_{n}^{(\alpha ,\beta )}(x)\) arranged in decreasing order on \((-1,1)\), where \(\alpha ,\beta >-1\), and \(\theta _{n,k}^{(\alpha ,\beta )}=\arccos x_{n,k}^{(\alpha ,\beta )}\). Gautschi, in a series of recent papers, conjectured that the inequalities

$$n\theta_{n,k}^{(\alpha,\beta)}<(n+1)\theta_{n+1,k}^{(\alpha,\beta)} $$

and

$$(n+(\alpha+\beta+3)/2)\theta_{n+1,k}^{(\alpha,\beta)}<(n+(\alpha+\beta+1)/2)\theta_{n,k}^{(\alpha,\beta)}, $$

hold for all \(n\geq 1\), \(k=1,\ldots ,n\), and certain values of the parameters \(\alpha \) and \(\beta \). We establish these conjectures for large domains of the \((\alpha ,\beta )\)-plane by using a Sturmian approach.