We know that two dimensional discrete GFF(2d-DGFF) on a box $V_N=N[0,1]^2\cap\mathbb{Z}$ with Dirichlet boundary condition will converge in distribution to the 2d continuum GFF with Dirichlet boundary condition, in the sense of convergence of the field acting on any suitable test functions. And we know 2d-DGFF can be seen as an analogue of branching random walks, especially 4-ary branching random walks with i.i.d. Gaussian increments.
So we embed the family tree of a 4-ary tree on the interval $[0,1]$, in the following sense. We code the root as 0, and code its each offspring with 0 and add another integer in the order of 0,1,2, and 3: 00,01,02,03. Continue doing this we get a code for the whole family tree. For a tree of depth $n$, we get $4^n$ leaves each labelled by $(n+1)$ integers from $\{0,1,2,3\}$. And we map these nodes to the interval $[0,1]$ in the 4-adic way. For $u=(0,u_1,\cdots,u_n)$ we map it to $\pi(u):=\sum_{i=1}^n \frac{u_i}{4^i}$. Finally, we assign i.i.d. standard Gaussian increments $Y_{e}$ on the edges and let $X_{\pi(u)}=X_u:=\sum_{e\in 0\leftrightarrow u}Y_e$ as the Gaussian branching random walk embedded on $[0,1]$.
Question is: does this field converge in distribution(in the sense against any test functions) to some random generalized function on $[0,1]$ like continuum GFF? I think the answer should be yes, then how to describe it?
