1,3

This sequence comes from a corrected and extended example in the paper by Besser and Moree.

D. Gijswijt and P. Moree, A set-theoretic invariant, (vide the ArXiv or http://staff.science.uva.nl/~moree/preprints.html)

F. J. van de Bult, D. C. Gijswijt, J. P. Linderman, N. J. A. Sloane and A. R. Wilks, A Slow-Growing Sequence Defined by an Unusual Recurrence, J. Integer Sequences, Vol. 10 (2007), #07.1.2.

A. Besser, P. Moree, On an invariant related to a linear inequality, Arch. Math. 79: pp. 463-471

a(t)=(-1)^t/2 sum_{d|p_1...p_t, d\le \sqrt{p_1...p_t}mu(d),

Invariant[a_List] := Module[{i=1, j=2, xMin, xMax, aa, n, invar=0, signs, x}, xMin=Abs[a[[i]]-a[[j]]]; xMax=a[[i]]+a[[j]]; aa=Complement[a, {a[[i]], a[[j]]}]; n=Length[aa]; Do[signs=(2*IntegerDigits[k, 2, n]-1); x=aa.signs; If[x>xMin&&x<xMax, invar+=Times@@signs], {k, 0, 2^n-1}]; invar]; Table[theSet=Table[N[Log[Prime[i]]], {i, 1, n}]; Invariant[theSet], {n, 3, 23, 2}]

Cf. A068101.

Sequence in context: A063937 A027211 A027235 this_sequence A036882 A020962 A027243

Adjacent sequences: A086593 A086594 A086595 this_sequence A086597 A086598 A086599

hard,sign

T. D. Noe (noe(AT)sspectra.com), Aug 01 2003