1,1

A. K. Devaraj conjectured that these numbers are exactly Carmichael numbers. It was proved http://www.mersenneforum.org/showpost.php?p=55271 that every Carmichael number is indeed a Devaraj number, but the converse is not true. Devaraj numbers that are not Carmichael are given by A104017.

These numbers can't be even, since phi(N) is always even (N>2) but p1=2 implies that gcd{pi-1}=1 and N-1 is odd. [From M. F. Hasler (MHasler(AT)univ-ag.fr), Apr 03 2009]

(PARI) { Devaraj() = for(n=2, 10^8, f=factorint(n); if(vecmax(f[, 2])>1, next); f=f[, 1]; r=length(f); if(r==1, next); d=f[1]-1; p=f[1]-1; for(i=2, r, d=gcd(d, f[i]-1); p*=f[i]-1); if( ((n-1)^(r-2)*d^2)%p==0, print1(" ", n)) ) }

Contribution from M. F. Hasler (MHasler(AT)univ-ag.fr), Apr 03 2009: (Start)

(PARI) isA104016(n)={ local(f=factor(n)); vecmax(f[, 2])==1 & #(f*=[1, -1]~)>1 & gcd(f)^2*(n-1)^(#f-2)%prod(i=1, #f, f[i])==0 }

/* To print the list: */ forstep( n=3, 10^6, 2, vecmax((f=factor(n))[, 2])>1 & next; #(f*=[1, -1]~)>1 | next; gcd(f)^2*(n-1)^(#f-2)%prod(i=1, #f, f[i]) | print1(n", "))

/* The following version could be efficient for large omega(n) */

isA104016(n) = issquarefree(n) & !isprime(n) & Mod(n-1, prod(i=1, #n=factor(n)*[1, -1]~, n[i]))^(#n-2)*gcd(n)^2==0 \\ (End)

Cf. A104017, A002997.

Sequence in context: A135721 A047713 A006971 this_sequence A002997 A087788 A083733

Adjacent sequences: A104013 A104014 A104015 this_sequence A104017 A104018 A104019

nonn

Max Alekseyev (maxale(AT)gmail.com), Feb 25 2005