Energy identity for approximate harmonic maps from surface to general targets
Abstract
Let un be a sequence of mappings from a closed Riemannian surface M to a general Riemannian manifold N. If un satisfies n(\|∇ un\|L2(M)+\|τ(un)\|Lp(M))≤ for some\,\,p>1, where τ(un) is the tension field of un, then there hold the so called energy identity and neckless property during blowing up. This result is sharp by Parker's example, where the tension fields of the mappings from Riemannian surface are bounded in L1(M) but the energy identity fails.
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