A functional equation for monomial functions
Abstract
Let F⊂ K be fields with characteristic zero, n be a positive integer and ∈ K. In this paper, we determine those monomials f F K of degree n for which \[ f(x2)= · xnf(x) \] holds for all x∈ F. We show that similar to the classical results, where additive functions were considered, the monomial functions in the equation can be represented with the aid of homomorphisms and higher-order derivations.
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