A binary relation $R$ on $\mathbb{N}$ is *$(n,k)$-Ramsian* iff for every coloring $f:[\mathbb{N}]^n\rightarrow l$, there exists a subset $G$ of $\mathbb{N}$
such that $(G,R)$ is isomorphic to $(\mathbb{N},R)$ and $|f([G]^n)|\leq k$.

Question: Which binary relation is $(n,k)$-Ramsian?

Is there any known result?

We know some special example. Say when $R$ is trivial (R=$\emptyset$), then 
it is $(n,1)$-Ramsian (which is just the classic Ramsey theorem). When 
$(\mathbb{N},R)$ is a linear dense order structure then it is $(2,2)$-Ramsian,
$(3,12)$-Ramsian and for every $n$ there exists $k_n$ such that it is $(n,k_n)$-Ramsian.