English

Random planar trees and the Jacobian conjecture

Combinatorics 2026-01-26 v3 Algebraic Geometry Probability

Abstract

We develop a probabilistic approach to the celebrated Jacobian conjecture, which states that any Keller map (i.e. any polynomial mapping F ⁣:CnCnF\colon \mathbb{C}^n \to \mathbb{C}^n whose Jacobian determinant is a nonzero constant) has a compositional inverse which is also a polynomial. The Jacobian conjecture may be formulated in terms of a problem involving labellings of rooted trees; we give a new probabilistic derivation of this formulation using multi-type branching processes. Thereafter, we develop a simple and novel approach to the Jacobian conjecture in terms of a problem involving shuffling subtrees of dd-Catalan trees, i.e. planar dd-ary trees. We also show that, if one can construct a certain Markov chain on large dd-Catalan trees which updates its value by randomly shuffling certain nearby subtrees, and in such a way that the stationary distribution of this chain is uniform, then the Jacobian conjecture is true. Finally, we use the local limit theory of large random trees to show that the subtree shuffling conjecture is true in a certain asymptotic sense, and thereafter use our machinery to prove an approximate version of the Jacobian conjecture, stating that inverses of Keller maps have small power series coefficients for their high degree terms.

Keywords

Cite

@article{arxiv.2301.08221,
  title  = {Random planar trees and the Jacobian conjecture},
  author = {Elia Bisi and Piotr Dyszewski and Nina Gantert and Samuel G. G. Johnston and Joscha Prochno and Dominik Schmid},
  journal= {arXiv preprint arXiv:2301.08221},
  year   = {2026}
}

Comments

34 pages, 6 figures

R2 v1 2026-06-28T08:15:37.349Z