The heat flow driven by the Laplacian of a directed hypergraph (2510.17497v1)

Abstract: We develop a spectral and semigroup theory for Laplacians on directed hypergraphs, a setting where classical Markovian and symmetry principles of graph Laplacians break down. This framework reveals new phenomena: the heat flow may lose positivity, stochasticity, or diagonal dominance, yet regain them asymptotically under precise combinatorial conditions. We derive spectral bounds, characterize eventual positivity and contractivity in $\infty$-norm, and identify the rare cases where the flow remains Markovian. Several examples -- culminating in hypergraphs that are dual of oriented graphs as well as directed realizations of the Fano plane - highlight the genuinely higher-order nature of these dynamics.