Abstract:
The global homeomorphism theorem for quasiconformal maps describes the following specifically higher-dimensional phenomenon:
Locally invertible quasiconformal mapping$f: {\mathbb R}^{n} \to {\mathbb R}^{n}$is globally invertible provided
$n > 2$. We prove the following operator version of the global homeomorphism theorem.
If the operator $ f: H \to H $ acting in the Hilbert space $ H $ is locally invertible and is an operator of bounded distortion, then it is globally invertible.
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