Blowup behavior of harmonic maps with finite index

Abstract

In this paper, we study the blow-up phenomena on the αk-harmonic map sequences with bounded uniformly αk-energy, denoted by \uαk: αk>1 and αk 1\, from a compact Riemann surface into a compact Riemannian manifold. If the Ricci curvature of the target manifold is of a positive lower bound and the indices of the αk-harmonic map sequence with respect to the corresponding αk-energy are bounded, then, we can conclude that, if the blow-up phenomena occurs in the convergence of \uαk\ as αk 1, the limiting necks of the convergence of the sequence consist of finite length geodesics, hence the energy identity holds true. For a harmonic map sequence uk:(,hk)→ N, where the conformal class defined by hk diverges, we also prove some similar results.