Erratum: On Schrödinger maps

We study the well-posedness of the Cauchy problem for Schrödinger maps from R m × R into a compact Riemann surface N. The idea is to find an appropriate frame for u -1 T N so that the derivatives will satisfy a certain class of nonlinear Schrödinger equations; then the Strichartz estimates can be ap

## Abstract For the Schrödinger flow from ℝ^2^ × ℝ^+^ to the 2‐sphere 𝕊^2^, it is not known if finite energy solutions can blow up in finite time. We study equivariant solutions whose energy is near the energy of the family of equivariant harmonic maps. We prove that such solutions remain close to

## Abstract We first construct traveling wave solutions for the Schrödinger map in ℝ^2^ of the form __m__(__x__~1~, __x__~2~ − ϵ __t__), where __m__ has exactly two vortices at approximately $\font\open=msbm10 at 10pt\def\R{\hbox{\open R}}(\pm {{1}\over{2 \epsilon}}, 0) \in \R^2$ of degree ±1. We

The proof of lemma 5.2 in [1] contains several mistakes. Nevertheless, the statement is correct and is proven in an elementary fashion, correctly this time, in [3, lemma 2.4], which is in this issue of the journal. In the proof of corollary 3.2 in [1], we misquoted from Kato's textbook on perturbat

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