Energy identity and removable of singularities of maps from a Riemann surface with tension field unbounded in $L^2$

Mathematics – Analysis of PDEs

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Final version, to appear in PJM

Scientific paper

In this paper we will prove the removable singularity results for maps with bounded energy from the unit disk $B$ of $R^2$ centered at the origin to a closed Riemannian manifold whose tension field is unbounded in $L^2(B)$ but satisfying the following condition: For\s some\s 0

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