1,1

Related to A005179, "Smallest number with exactly n divisors", with which it shares a lot of common terms (in different positions).

Johan Claes, homepage.

a(1)=3 because there is only one difference of positive squares which equals 3 (2^2-1^1).

a(2)=15 because 15 = 4^2-1^2 = 8^2-7^2.

a(3)=45 because 45 = 7^2-2^2 = 9^2-6^2 = 23^2-22^2.

s = Split[ Sort[ Flatten[ Table[ Select[ Table[ b^2 - c^2, {c, b - 1}], # < 500000 &], {b, 250000}]]]]; f[s_, p_] := Block[{l = Length /@ s}, If[ Position[l, p, 1, 1] != {}, d = s[[ Position[l, p, 1, 1][[1, 1]] ]] [[1]], d = 0]; d]; t = Table[ f[s, n], {n, 36}] (from Robert G. Wilson v Jun 04 2004)

(PARI) {occurrences(d)=local(c, n, a); c=0; for(n=1, (d-1)\2, if(issquare(a=n^2+d), c++)); c} {m=50; z=30000; v=vector(m, n, -1); for(d=1, z, k=occurrences(d); if(0<k&&k<=m&&v[k]<0, v[k]=d)); for(n=1, m, print1(v[n], ", "))} (Klaus Brockhaus)

Cf. A068314.

Sequence in context: A127407 A161400 A112810 this_sequence A050534 A048099 A030505

Adjacent sequences: A094188 A094189 A094190 this_sequence A094192 A094193 A094194

nonn

Johan Claes (johan.claes(AT)luc.ac.be), Jun 02 2004

Edited by Don Reble (djr(AT)nk.ca) and Klaus Brockhaus (klaus-brockhaus(AT)t-online.de), Jun 04 2004

Further terms from Johan Claes (johan.claes(AT)luc.ac.be), Jun 07 2004