The third positive element in the greedy $B_h$-set

TL;DR

This paper studies the structure of greedy $B_h$-sets, focusing on the third element, providing explicit formulas and bounds for elements in these sets for all $h \

Contribution

It introduces elementary proofs for the third element and bounds of greedy $B_h$-sets, advancing understanding of their structure.

Findings

Explicit formula for the third element: $a_3(h) = h^2+h+1$.

Upper bounds for elements: $a_k(h) \

Elementary proofs for properties of greedy $B_h$-sets.

Abstract

For $h \geq 1$, a $B_h$-set is a set of integers such that every integer $n$ has at most one representation in the form $n = a_{i_1} + \cdots + a_{i_h}$, where $a_{i_j} \in A$ for all $j = 1,\ldots, h$ and $a_{i_1} \leq \ldots \leq a_{i_h}$. The greedy $B_h$-set is the infinite set of nonnegative integers $\{a_0(h), a_1(h), a_2(h), \ldots \}$ constructed as follows: If $a_0(h) = 0$ and $\{a_0(h), a_1(h), a_2(h), \ldots, a_k(h) \}$ is a $B_h$-set, then $a_{k+1}(h)$ is the least positive integer such that $\{a_0(h), a_1(h), a_2(h), \ldots, a_k(h), a_{k+1}(h) \}$ is a $B_h$ set. One has $a_1(h) = 1$ and $a_2(h) = h+1$ for all $h$. Elementary proofs are given that $a_3(h) = h^2+h+1$ for all $h \geq 1$ and that $a_k(h) \leq \sum_{i=0}^{k-1} h^i$ for all $h \geq 1$ and $k \geq 1$.