Isotropic Positive Definite Functions on Spheres

Abstract

In this paper, we investigate the relationship between positive definite functions on the unit sphere and on the Euclidean space d. For the dimension d to be odd, a new technique is developed to establish the inheritance of positive (semi-)definite property from d to and the converse. For d=2, it is proved that a function defined by f,δ(t)=(-t)+δ, δ≥ d+12 is positive definite on the unit sphere S2 by restricting in an absolute range. Our results can verify a conjecture proposed by R.K. Beatson, W. zu Castell, Y. Xu and a sharp P\'olya type criterion for positive definite functions on spheres.