Partitioning a set into similar, if not, identical, parts is a fundamental research topic in combinatorics. The question of partitioning the integers in various ways has been considered throughout history. Given a set ${x_1, ldots, x_n}$ of integers where $x_1<cdots<x_n$, let the {it gap sequence} of this set be the nondecreasing sequence $d_1, ldots, d_{n-1}$ where ${d_1, ldots, d_{n-1}}$ equals ${x_{i+1}-x_i:iin{1,ldots, n-1}}$ as a multiset. This paper addresses the following question, which was explicitly asked by Nakamigawa: can the set of integers be partitioned into sets with the same gap sequence? The question is known to be true for any set where the gap sequence has length at most two. This paper provides evidence that the question is true when the gap sequence has length three. Namely, we prove that given positive integers $p$ and $q$, there is a positive integer $r_0$ such that for all $rgeq r_0$, the set of integers can be partitioned into $4$-sets with gap sequence $p, q$, $r$.