On isometries of conformally invariant metric
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isometriesmetriccaseconformallyinvariantparticularproveconjecture
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We prove that isometries in a conformally invariant metric of a general domain are quasiconformal. In the particular case of the punctured space, we prove that isometries in this metric are Mobius, thus resolving a conjecture of Ferrand, Martin and Vuorinen [FMV, p. 200] in this particular case.
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