Consider last passage percolation model on $\mathbb{Z}^2$. I am interested to know if there is any known result for the stationary distribution of passage times, given some distribution for the weights. To be more precise, let us consider the passage times $G(R,U)$ from the origin to a point $(R,U)$
$$G(R,U)=\max_{p\in \Pi(R,U)}\sum_{(i,j)\in p} X(i,j)$$
where $\Pi(R,U)$ is an up-right path from the origin to $(R,U)$, and $X(i,j)$ is the weight at $(i,j)$, with as yet unspecified distribution.
When $i+j$ tends to infinity, but $i-j$ does not, we may expect that $G(i,j)-\mu(i,j)$ approaches a limiting distribution for semi-infinite paths, where $\mu(i,j)$ represents the mean (which obviously does grow).
My question. Are there any models where this limiting distribution is known?
Edit: I think the better way to define what I'm after is in terms of the Buseman functions
$$B(i,j|k,l)=G(i,j)-G(k,l)$$
which measure the difference of path lengths to two points. Now the question now concerns $B(i,j|k,l)$ for (say) $i+j=k+l\to \infty$. The simplification of considering both $(i,j)$ and $(k,l)$ on the same diagonal is that one is asking for a distribution of the $B(i,j|k,l)$ that is preserved under the recursion that propagates the $G(i,j)$ from one diagonal to the next.
