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Hugh Thomas
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SuposseSuppose $M$ and $N$ are Riemannian manifoldmanifolds (non compact  )of of dimension $2$ and $f$ is an harmonic map between $M$ and $N$. When is $f$ conformal?

Suposse $M$ and $N$ are Riemannian manifold (non compact  )of dimension $2$ and $f$ is an harmonic map between $M$ and $N$. When is $f$ conformal?

Suppose $M$ and $N$ are Riemannian manifolds (non compact) of dimension $2$ and $f$ is an harmonic map between $M$ and $N$. When is $f$ conformal?

Suposse M$M$ and N$N$ are Riemannian manifold (non compact )of dimension 2$2$ and f$f$ is an harmonic map between M$M$ and N$N$. When f is $f$ conformal?

Suposse M and N are Riemannian manifold (non compact )of dimension 2 and f is an harmonic map between M and N. When f is conformal?

Suposse $M$ and $N$ are Riemannian manifold (non compact )of dimension $2$ and $f$ is an harmonic map between $M$ and $N$. When is $f$ conformal?

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Harmonic maps between surfaces

Suposse M and N are Riemannian manifold (non compact )of dimension 2 and f is an harmonic map between M and N. When f is conformal?