On the regularity of harmonic maps from RCD(K,N) to CAT(0) spaces and related results

Abstract

For an harmonic map u from a domain U⊂ X in an RCD(K,N) space X to a CAT(0) space Y we prove the Lipschitz estimate \[ Lip(u|B)≤ C(K-R2,N)r∈f o∈ Y\,1 m(2B)∫2B d Y2(u(·), o)\, d m, ∀ 2B⊂ U \] where r∈(0,R) is the radius of B. This is obtained by combining classical Moser's iteration, a Bochner-type inequality that we derive (guided by recent works of Zhang-Zhu) together with a reverse Poincar\'e inequality that is also established here. A direct consequence of our estimate is a Lioville-Yau type theorem in the case K=0. Among the ingredients we develop for the proof, a variational principle valid in general RCD spaces is particularly relevant. It can be roughly stated as: if ( X, d, m) is RCD(K,∞) and f∈ Cb( X) is so that f≤ C for some constant C>0, then for every t>0 and m-a.e.\ x∈ X there is a unique minimizer Ft(x) for y\ \ f(y)+ d2(x,y)2t and the map Ft satisfies \[ (Ft)* m≤ et(C+2K- Osc(f)) m, Osc(f):= f-∈f f. \] Here existence is in place without any sort of compactness assumption and uniqueness should be intended in a sense analogue to that in place for Regular Lagrangian Flows and Optimal Maps (and is related to both these concepts). Finally, we also obtain a Rademacher-type result for Lipschitz maps between spaces as above.