A generalization of the Picard theorem
Abstract
We recall the notions of conformal and quasiconformal mappings in the sense of Gromov, extending the classical notions of conformal and quasiconformal mappings, and prove the following theorem. If the mapping F: Rn R2 , where n ≥ 2 , quasiconformal in the sense of Gromov, omits more than one value on the plane R2 , then it is a constant mapping.
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