Emergent Geometry Governs Optimal Control in Driven Stokes Flows

In a canonical Stokes flow geometry, the Hele–Shaw cell, we show that tunable circulations induced by Lorentz forces in a conducting fluid enable particle control. We reveal that energy-optimal control paths correspond to geodesics of an emergent Riemannian metric, which are time-optimal under a maximum-power constraint. Particle paths exhibit metric-governed anisotropic diffusion under random boundary forcing. These geometric concepts, though developed explicitly for circulation-driven Hele-Shaw flows, generalize to generic driven Stokes flows and so shed light on recent observations in a three-dimensional context.