Functional equations on abelian groups with involution |
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Authors: | H. Stetkær |
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Affiliation: | (1) Department of Mathematics, Aarhus University, Ny Munkegade, DK-8000 Aarhus C, Denmark |
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Abstract: | Summary We produce complete solution formulas of selected functional equations of the formf(x +y) ±f(x + σ (ν)) = Σ I 2 =1 g l (x)h l (y),x, y∈G, where the functionsf,g 1,h 1 to be determined are complex valued functions on an abelian groupG and where σ:G→G is an involution ofG. The special case of σ=−I encompasses classical functional equations like d’Alembert’s, Wilson’s first generalization of it, Jensen’s equation and the quadratic equation. We solve these equations, the equation for symmetric second differences in product form and similar functional equations for a general involution σ. |
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Keywords: | 39B32 |
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