Remarks on approximate harmonic maps in dimension two

Abstract

For the class of approximate harmonic maps u∈ W1,2(,N) from a closed Riemmanian surface (,g) to a compact Riemannian manifold (N, h), we show that (i) the so-called energy identity holds for weakly convergent approximate harmonic maps \un\: N, with tension fields τ(un) bounded in the Morrey space M1,δ() for some 0δ<2; and (ii) if an approximate harmonic map u has tension field τ(u)∈ L L() M1,δ() for some 0δ<2, then u∈ W2,1(, N). Based on these estimates, we further establish the bubble tree convergence, referring to energy identity both L2,1 of gradients and L1-norm of hessians and the oscillation convergence, for a weakly convergent sequence of approximate harmonic maps \un\, with tension fields τ(un) uniformly bounded in M1,δ() for some 0δ<2 and uniformly integrable in L L().