Optimal rigidity estimates for maps of a compact Riemannian manifold to itself

Abstract

Let M be a smooth, compact, connected, oriented Riemannian manifold, and let : M Rd be an isometric embedding. We show that a Sobolev map f: M M which has the property that the differential df(q) is close to the set SO(Tq M, Tf(q) M) of orientation preserving isometries (in an Lp sense) is already W1,p close to a global isometry of M. More precisely we prove for p ∈ (1,∞) the optimal linear estimate ∈fφ ∈ Isom+(M) \| f - φ\|W1,pp C Ep(f) where Ep(f) := ∫M distp(df(q), SO(Tq M, Tf(q) M)) \, d volM and where Isom+(M) denotes the group of orientation preserving isometries of M. This extends the Euclidean rigidity estimate of Friesecke-James-M\"uller [Comm. Pure Appl. Math. 55 (2002), 1461--1506] to Riemannian manifolds. It also extends the Riemannian stability result of Kupferman-Maor-Shachar [Arch. Ration. Mech. Anal. 231 (2019), 367--408] for sequences of maps with Ep(fk) 0 to an optimal quantitative estimate. The proof relies on the weak Riemannian Piola identity of Kupferman-Maor-Shachar, a uniform C1,α approximation through the harmonic map heat flow, and a linearization argument which reduces the estimate to the well-known Riemannian version of Korn's inequality.