On lower order of mappings with finite length distortion
Abstract
For mappings of finite distortion actively investigated last 15--20 years, problems of a so-called lower order are discussed. It is proved that, mappings with finite length distortion f:D→ Rn, n 2, which have locally integrable other dilatation in degree α>n-1, and have a finite asymptotic value are of a uniformly lower bounded lower order.
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