Vectorial variational problems in L∞ constrained by the Navier-Stokes equations

Abstract

We study a minimisation problem in Lp and L∞ for certain cost functionals, where the class of admissible mappings is constrained by the Navier-Stokes equations. Problems of this type are motivated by variational data assimilation for atmospheric flows arising in weather forecasting. Herein we establish the existence of PDE-constrained minimisers for all p, and also that Lp minimisers converge to L∞ minimisers as p∞. We further show that Lp minimisers solve an Euler-Lagrange system. Finally, all special L∞ minimisers constructed via approximation by Lp minimisers are shown to solve a divergence PDE system involving measure coefficients, which is a divergence-form counterpart of the corresponding non-divergence Aronsson-Euler system.