The project initiated a new research direction. Statistical physicists have non-rigorous (and sometimes wrong) conjectures about the structures of random graphs.
In the recent years, some of these intuitions are transformed to mathematical proofs by extremely long mathematical papers.
But we realized that some of these ideas are similar to ours, and it would be very beneficial to connect these areas.
A new research group about these problems has already formed at Rényi Institute. Our first big but very plausible goal is to understand, simplify and generalize the 78 pages long recent Acta Mathematica paper about the independence ratio of random regular graphs. The ultimate goal is to connect graph limit theory with statistical physics, hereby discovering and deeply understanding unknown phase transitions, and hereby getting a better understanding the structures of large graphs. This may give new explanation of real-life phenomena such as ``regime changes'' or aging.