A note on n-divisible positive definite functions

Abstract

Let PD(R) be the family of continuous positive definite functions on R. For an integer n>1, a f∈ PD(R) is called n-divisible if there is g∈ PD(R) such that gn=f. Some properties of infinite-divisible and n-divisible functions may differ in essence. Indeed, if f is infinite-divisible, then for each integer n>1, there is an unique g such that gn=f, but there is a n-divisible f such that the factor g in gn=f is generally not unique. In this paper, we discuss about how rich can be the class \g∈ PD(R): gn=f\ for n-divisible f∈ PD(R) and obtain precise estimate for the cardinality of this class.