Abstract
Several refinements of Picard’s theorem for entire functions in the complex plane have been proved by many authors in connection with the theory of Picard sets. We prove a result of this type for entire quasiregular mappings in euclidean n n -space in the case when the "Picard set" consists of a sequence a k {a_k} on a ray emanating from 0 with | a k | = 2 k |{a_k}| = {2^k} .
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