Positive definite functions on the unit sphere and integrals of Jacobi polynomials

Abstract

It is shown that the integrals of the Jacobi polynomials equation*%eq:FnJ ∫0t (t-θ)δ Pn(α-12,β-12)( θ) ( θ2)2 α ( θ2)2 β dθ > 0 equation* for all t ∈ (0,π] and n ∈ N if δ α + 1 for α,β ∈ N0 and \α,β\ > 0. This proves a conjecture on the integral of the Gegenbauer polynomials in BCX that implies the strictly positive definiteness of the function θ (t - θ)+δ on the unit sphere Sd-1 for δ d2 and the Poly\`a criterion for positive definite functions on the sphere for all dimensions. Moreover, the positive definiteness of the function θ (t - θ)+δ is also established on the compact two-point homogeneous spaces.