The fourth positive element in the greedy Bh-set
Abstract
For h ≥ 1, a Bh-set is a set of integers such that every integer n has at most one representation in the form n = ai1 + ·s + aih, where air ∈ A for all r = 1,…, h and ai1 ≤ … ≤ aih. The greedy Bh-set is the infinite set of nonnegative integers \a0(h), a1(h), a2(h), … \ constructed as follows: If a0(h) = 0 and \a0(h), a1(h), a2(h), …, ak(h) \ is a Bh-set, then ak+1(h) is the least positive integer such that \a0(h), a1(h), a2(h), …, ak(h), ak+1(h) \ is a Bh-set. Then a1(h) = 1, a2(h) = h+1, and a3(h) = h2+h+1 for all h. This paper proves that a4(h), the fourth term of the greedy Bh-set is ( h3 + 3h2 + 3h + 1) /2 if h is odd and ( h3 + 2h2 + 3h + 2) /2 if h is even.
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