Absolutely Minimising Generalised Solutions to the Equations of Vectorial Calculus of Variations in L∞

Abstract

Consider the supremal functional \[ 1 1 E∞(u,A) \,:=\, \|L(·,u,D u)\|L∞(A), A⊂eq , \] applied to W1,∞ maps u:⊂eq R RN, N≥ 1. Under certain assumptions on L, we prove for any given boundary data the existence of a map which is: i) a vectorial Absolute Minimiser of 1 in the sense of Aronsson, ii) a generalised solution to the ODE system associated to 1 as the analogue of the Euler-Lagrange equations, iii) a limit of minimisers of the respective Lp functionals as p→∞ for any q≥ 1 in the strong W1,q topology \& iv) partially C2 on off an exceptional compact nowhere dense set. Our method is based on Lp approximations and stable a priori partial regularity estimates. For item ii) we utilise the recently proposed by the author notion of D-solutions in order to characterise the limit as a generalised solution. Our results are motivated from and apply to Data Assimilation in Meteorology.