Martingales, laminates and minimal Korn inequalities

Abstract

Korn's inequalities show that the L2-norm of ∇ u can be controlled by the L2-norm of Sym(∇ u), which only has d(d+1)/2 components. In [J. Math. Pures Appl. 148 (2021), pp. 199-220] Chipot posed the question of how many scalar measurements are needed to have a Korn-type control on ∇ u when u is in H01(Ω) and H1(Ω), introducing the minimal numbers N(d,Ω) and N'(d,Ω) respectively. He proved general bounds and calculated several low-dimensional values of N,N'. We reframe Chipot's problem in the language of rank-one convexity and quasiconvexity and obtain a purely algebraic characterisation of when such inequalities hold, which yields the sharp bounds align* N(d,Ω)&=2d(1-o(1))\\ N'(d,Ω)&=2d-1. align* As a consequence, we recover and streamline several of Chipot's results, we obtain a dimension-optimal Korn inequality and several sharp estimates for the best constant for various Korn-type inequalities. Generalisations to the rectangular case and to general Lp estimates are also considered. The central new ingredient of our approach is a systematic connection between laminates and martingales which produces explicit families of laminates realising these bounds. This method is of independent interest in the calculus of variations: for instance, we use it to obtain a new quick and quantitative proof of Ornstein's non-inequality, valid for all first order homogeneous operators in R2× 2 and for a large class of operators in general dimensions (including Korn's ∇ u+∇ ut2 and ∇ u+∇ ut2-div(u)Idd).