A note on necessary conditions for a friend of 10

Abstract

Solitary numbers are shrouded with mystery. A folklore conjecture assert that 10 is a solitary number i.e. it has no friends. In this article, we establish that if N is a friend of 10 then it must be odd square with at least seven distinct prime factors, with 5 being the least one. Moreover there exists a prime factor p of N such that 2a+1 0 f and 5f 1 p where f is the smallest odd positive integer greater than 1 and less than or equal to \ 2a+1,p-1\, provided 52a N. Further, there exist prime factors p and q (not necessarily distinct) of N such that p1 10 and q 1 6. Besides, we prove that if a Fermat prime Fk divides N then N must have a prime factor congruent to 1 modulo 2Fk. Also, if we consider the form of N as N=52am2 then m is non square-free. Furthermore, we show that (N)≥ 2ω(N)+6a-4 and if (m)≤ K then N< 5· 6(2K-2a+1-1)2 where (n) and ω(n) denote the total number of prime factors and the number of distinct prime factors of the integer n respectively.