English

Combinatorial Identities Via Phi Functions and Relatively Prime Subsets

Number Theory 2010-02-18 v1

Abstract

Let nn be a positive integer and let AA be nonempty finite set of positive integers. We say that AA is relatively prime if gcd(A)=1\gcd(A) =1 and that AA is relatively prime to nn if gcd(A,n)=1\gcd(A,n)=1. In this work we count the number of nonempty subsets of AA which are relatively prime and the number of nonempty subsets of AA which are relatively prime to nn. Related formulas are also obtained for the number of such subsets having some fixed cardinality. This extends previous work for the cases where AA is an interval or a set in arithmetic progression. Applications include: a) An exact formula is obtained for the number of elements of AA which are co-prime to nn; note that this number is ϕ(n)\phi(n) if A=[1,n]A=[1,n]. b) Algebraic characterizations are found for a nonempty finite set of positive integers to have elements which are all pairwise co-prime and consequently a formula is given for the number of nonempty subsets of AA whose elements are pairwise co-prime. c) We provide combinatorial formulas involving Mertens function.

Keywords

Cite

@article{arxiv.1002.3254,
  title  = {Combinatorial Identities Via Phi Functions and Relatively Prime Subsets},
  author = {Mohamed El Bachraoui},
  journal= {arXiv preprint arXiv:1002.3254},
  year   = {2010}
}
R2 v1 2026-06-21T14:47:53.203Z