Regularization and general methods in the theory of functional equations
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Publication:1924287
DOI10.1007/BF01818324zbMath0858.39010OpenAlexW1972858227MaRDI QIDQ1924287
László Székelyhidi, Antal jun. Járai
Publication date: 23 March 1997
Published in: Aequationes Mathematicae (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/137652
surveyregularizationD'Alembert type equationgeneral linear equationsLevi-Cività equationsnon-iterated functional equations
Related Items (4)
On the state of the second part of Hilbert's fifth problem ⋮ On Montel and Montel-Popoviciu theorems in several variables ⋮ Remarks on the Cauchy functional equation and variations of it ⋮ Stability of generalized Cauchy equations
Cites Work
- Regularity properties of polynomials on groups
- Regularity properties of exponential polynomials on groups
- On regular solutions of functional equations
- Christensen measurable solutions of generalized Cauchy functional equations
- On a functional equation concerning affine transformations
- The Twenty-fifth International Symposium on Functional Equations, August 16--22, 1987, Hamburg-Rissen, Germany. (Abstracts of the meeting)
- Regularity properties of functional equations and inequalities
- Note on exponential polynomials
- On characterizations of exponential polynomials
- Remark to a paper by J. A. Baker
- On the functional equation f(x)g(y)=h(ax+by)k(cx+dy)
- Über die stetigen Lösungen der Aczel-Benz'schen Funktionalgleichung
- The general solution of a functional equation related to the mixed theory of information
- The solution of the functional equation of d'Alembert's type for commutative groups
- Difference operators, distributions and functional equations
- On reduction of linear two variable functional equations to differential equations without substitutions
- On a functional equation which contains a real-valued function of vector variable
- Über das harmonische Produkt und eine korrespondierende Funktionalgleichung. (On the harmonic product and its corresponding functional equation)
- Verallgemeinerungen eines Satzes von H. Steinhaus
- On the functional equation f(x)g(y) = p(s+y)q(x/y)
- The matrix equation \(a(x\cdot y)=a(x)+a(x)a(y)+a(y)\)
- A solution of the functional equation \(\varphi(x- y)=\sum_1^na_j(x){overline {a_ja(y)}}\) on a locally compact abelian group
- A solution of D'Alembert's functional equation on a locally compact Abelian group
- Equations of the form \(H(x\cdot y)=\sum_if_i(x)g_i(y)\)
- Teoremi di regolarita per una classe di equazioni funzionali
- Verallgemeinerte Cauchy-Funktionalgleichungen
- On Lipschitz property of solutions of functional equations
- Ein Beitrag zur Baire-Kategorie-Theorie
- Functional equations and hypoellipticity
- On the functional equation \(f(x)g(y) = \prod\limits_{i=1}^n h_i (a_i x + b_i y)\)
- Über die multiplikative Cauchysche Funktionalgleichung für Matrizen dritter Ordnung
- General and regular solutions of functional equations characterizing harmonic polynomials
- Finite dimensional translational invariant subspaces
- Some unsolved problems in the theory of functional equations
- Generalized Gaussian measure and a 'functional equation'. I
- Boundedness on a set of positive measure and the mean value property characterizes polynomials on a space \(V^ n\)
- Generalized Gaussian measures and a 'functional equation'. II
- Measurability and continuity for a functional equation on a topological group
- Functional equations and characterization of probability laws through linear functions of random variables
- On single-product functions with rotational symmetry
- Shorter Notes: A Generalization of a Theorem of S. Piccard
- Partitions of the Plane Into Sets Having Positive Measure in Every Non-Null Measurable Product Set
- A General Functional Equation
- A Cosine Functional Equation in Hilbert Space
- Shorter Notes: On Measurable Local Homomorphisms
- Problem 24 of the "Scottish book concerning additive functionals
- Functional Equations, Tempered Distributions and Fourier Transforms
- The state of the second part of Hilbert’s fifth problem
- A Characterization of the Multivariate Normal Distribution
- On the measurable solution of a functional equation arising in information theory
- The solution of a system of quadratic functional equations
- A canonical form for a system of quadratic functional equations
- The Regularity of the Locally Integrable and Continuous Solutions of Nonlinear Functional Equations
- A generalization of Steinhaus' theorem to coordinatewise measure preserving binary transformations
- Differentiation of implicit functions and Steinhaus' theorem in topological measure spaces
- Christensen measurability of polynomial functions and convex functions of higher orders
- Local Boundedness and Continuity for a Functional Equation on Topological Spaces
- Functional Equations, Distributions and Approximate Identities
- Über eine Lösungsmethode gewisser Funktionalgleichungen
- Quelques remarques sur l'équation fonctionnelle matricielle multiplicative de Cauchy
- The Functional Equation f(xy) + f(xy -1 ) = 2f(x)f(y) for Groups
- A “functional equation” for measures and a generalization of Gaussian measures
- On vanishing n-th ordered differences and Hamel bases
- On Strict Monotonicity of Continuous Solutions of Certain Types of Functional Equations
- On the measurable solutions of a functional equation
- On a metrical theorem in geometry of circles
- A Characterization of the Normal Distribution
- Regularity properties of functional equations
- On continuity of group homomorphisms
- Regularity properties of functional equations
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