Turbulent Dynamos on Bounded Domains and Their Generalization to the Geometric Transport Equation

Abstract

For any smooth bounded domain Ω⊂ R3, we construct a divergence-free velocity field u ∈ Lt1 W1,p(Ω) for all p < ∞, and magnetic fields Bε∈ Ltp Cm(Ω) for all p < ∞ and m∈ N, that solve the kinematic dynamo equation and exhibit arbitrarily fast growth of any magnetic energy mode, uniformly in the vanishing-diffusivity limit ε 0. The construction is based on the convex integration scheme of Modena-Székelyhidi and Cheskidov-Luo. The main novelty lies in the introduction of explicit potentials, which allow the solutions to be localized and avoid the need to work with the anti-curl operator. In addition, we present a unified scheme for the geometric transport equation (GTE), which encompasses both the transport and Maxwell equations.