Sur l'equation fonctionnelle f[x+yf(x)] = f(x)f(y)
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Publication:5516421
DOI10.4064/ap-17-2-193-198zbMath0141.32804OpenAlexW801102797MaRDI QIDQ5516421
Publication date: 1965
Published in: Annales Polonici Mathematici (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.4064/ap-17-2-193-198
Related Items (16)
Homomorphisms from functional equations: the Goldie equation ⋮ Beurling moving averages and approximate homomorphisms ⋮ Christensen measurable solutions of some functional equation ⋮ Continuous on rays solutions of an equation of the Gołąb-Schinzel type ⋮ Homomorphisms from Functional Equations in Probability ⋮ Additivity, subadditivity and linearity: automatic continuity and quantifier weakening ⋮ Variants on the Berz sublinearity theorem ⋮ Stability problem for the Gołąb-Schinzel type functional equations ⋮ On solutions of a common generalization of the Gołąb-Schinzel equation and of the addition formulae ⋮ Solutions of some functional equation bounded on nonzero Christensen measurable sets ⋮ Solution générale sur un groupe abelien de l'équation fonctionnelle \(f(x\ast f(y))=f(f(x)\ast y)\) ⋮ Semigroup-valued solutions of the Gołąb-Schinzel type functional equation ⋮ General regular variation, Popa groups and quantifier weakening ⋮ Solution générale de l'équation fonctionnelle \(f[x+yf(x) = f(x)f(y)\)] ⋮ Some unsolved problems in the theory of functional equations ⋮ Beurling regular variation, Bloom dichotomy, and the Gołąb-Schinzel functional equation
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