1,1

A primitive pseudoperfect number is a pseudoperfect number that is not a multiple of any other pseudoperfect number.

The odd entries so far are identical to the odd primitive abundant A006038. - Walter A. Kehowski (wkehowski(AT)cox.net), Aug 12 2005

N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, Academic Press, 1995 (includes this sequence).

R. K. Guy, Unsolved Problems in Number Theory, B2.

Eric Weisstein's World of Mathematics, Link to a section of The World of Mathematics.

with(numtheory): with(combinat): issemiperfect := proc(n) local b, S;

b:=false; S:=subsets(divisors(n) minus {n}); while not S[finished] do if

convert(S[nextvalue](), `+`)=n then b:=true; break fi od; return b end:

L:=remove(proc(z) isprime(z) end, [$1..5000]): PP:=[]: for zz from 1 to 1 do

for n in L do if issemiperfect(n) then PP:=[op(PP), n] fi od od;

sr := proc(l::list) local x, R, S, P, L; S:=sort(l); R:=[]; P:=S;

for x in S do

if not(x in R) then

L:=selectremove(proc(z) z>x and z mod x = 0 end, P);

R:=[op(R), op(L[1])]; P:=L[2];

fi; od; return P; end:

PPP:=sr(PP); # primitive pseudoperfect numbers less than 5000 (Walter A. Kehowski)

Cf. A005835.

Sequence in context: A119425 A006039 A064771 this_sequence A140738 A031005 A106528

Adjacent sequences: A006033 A006034 A006035 this_sequence A006037 A006038 A006039

nonn,nice

N. J. A. Sloane (njas(AT)research.att.com), R. K. Guy

More terms from Walter A. Kehowski (wkehowski(AT)cox.net), Aug 12 2005