An algebraic question I have been working on led me to a sequence that appears in OEIS as A186355: "adjusted joint rank sequence of $(f(i))$ and $(g(j))$ with $f(i)$ before $g(j)$ when $f(i)=g(j)$, where $f(i)=3i$ and $g(j)=j(j+1)/2$". This means that we assign to elements of these sequences positive integers such that every integer appears exactly once by assigning to each element the order in which it appears if we merge the two sequences, keeping pairs of equal elements in order ($f$ before $g$).
The OEIS entry does not really say how constructions like that appear. Can anyone enlighten me if there are some conceptual things behind such a construction?
