Values of algebraic functions at Liouville numbers
Abstract
In 1953 LeVeque proved the existence of Um-numbers by showing that for some specially defined Liouville number λ, the mth root λ1/m is in Um. In this article we study the following question: let u be an algebraic function of degree m and λ a Liouville number; under which conditions is u(λ) a Um-number? We consider a more refined notion of L-numbers, and show that, under very general assumptions, an algebraic function of degree m takes Um-values at all L-numbers.
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