Stochastic Conformal Flows in Even Dimensions
Abstract
We define two stochastic analogs of a geometric flow on even-dimensional manifolds called -curvature flow, and use the theory of Dirichlet forms to construct weak solutions to both. The first of these flows, which we call the normalized flow (NQF), preserves the intrinsic volume normalization from the deterministic setting. The second, which we call the Liouville flow (LQF), has a different normalization motivated by a similar flow studied in arXiv:1904.10909. The volume dynamics of NQF and LQF are shown to evolve as square Bessel and CIR processes, respectively. We also show that under certain additional conditions, LQF is a stochastic quantization of the even-dimensional Polyakov-Liouville measures recently defined in arXiv:2105.13925.
Cite
@article{arxiv.2506.01217,
title = {Stochastic Conformal Flows in Even Dimensions},
author = {Jack Piazza},
journal= {arXiv preprint arXiv:2506.01217},
year = {2025}
}
Comments
48 pages