English

A note on n-divisible positive definite functions

Classical Analysis and ODEs 2022-10-10 v1

Abstract

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

Keywords

Cite

@article{arxiv.2210.03503,
  title  = {A note on n-divisible positive definite functions},
  author = {Saulius Norvidas},
  journal= {arXiv preprint arXiv:2210.03503},
  year   = {2022}
}
R2 v1 2026-06-28T02:59:55.072Z