Email this article Hyperquasipolynomials and their applications
- Authors: Bykovskii V.A.1
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Affiliations:
- Far Eastern Branch of the Russian Academy of Sciences, Institute of Applied Mathematics Khabarovsk Division
- Issue: Vol 50, No 3 (2016)
- Pages: 193-203
- Section: Article
- URL: https://journal-vniispk.ru/0016-2663/article/view/234202
- DOI: https://doi.org/10.1007/s10688-016-0147-y
- ID: 234202
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Abstract
For a given nonzero entire function g: C → C, we study the linear space F(g) of all entire functions f such that
\(f\left( {z + w} \right)g\left( {z - w} \right) = {\varphi _1}\left( z \right){\psi _1}\left( w \right) + \cdots \varphi {n_{}}\left( z \right){\psi _n}\left( w \right),\)![]()
where φ1, ψ1,..., φn, ψn: C → C. In the case of g ≡ 1, the expansion characterizes quasipolynomials, that is, linear combinations of products of polynomials by exponential functions. (This is a theorem due to Levi-Civita.) As an application, all solutions of a functional equation in the theory of trilinear functional equations are obtained.About the authors
V. A. Bykovskii
Far Eastern Branch of the Russian Academy of Sciences, Institute of Applied Mathematics Khabarovsk Division
Author for correspondence.
Email: vab@iam.khv.ru
Russian Federation, Khabarovsk
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