1,1

The sequence is closed with respect to multiplication by positive integers (i.e. any multiple of any term in the sequence is in the sequence). The primitive entries of the sequence, i.e. those that are not multiples of other terms of the sequence, are given in A119425 (the first five are 6,20,28,45 and 63). The number of distinct sums of distinct divisors of n are given in A119347 and the actual sums are given in row n of the triangle A119348. Subsequence of A051774 (Max Alekseyev)

6 is in the sequence because from the divisors of 6, namely 1,2,3,6, we can form by addition 12 sums (1,2,3,...,12) and 12 < 2^tau(6)-1=2^4-1=15.

Sequence contains, for example, all multiples of 6 (1+2=3), all multiples of 20 (1+4=5), all multiples of 28 (1+2+4=7), all multiples of 63 (1+9=3+7).

with(numtheory): with(linalg): s:=proc(n) local dl, t:dl:=convert(divisors(n), list): t:=tau(n): nops({seq(innerprod(dl, convert(2^t+i, base, 2)[1..t]), i=1..2^t-1)}) end: a:=proc(n) if s(n)<2^tau(n)-1 then n else fi end: seq(a(n), n=1..230);

Cf. A000005, A051774, A119347, A119348, A119425.

Sequence in context: A049094 A105289 A051774 this_sequence A097216 A023196 A005835

Adjacent sequences: A119354 A119355 A119356 this_sequence A119358 A119359 A119360

nonn

Emeric Deutsch (deutsch(AT)duke.poly.edu), May 18 2006