Solutions and Stability of Generalized Kannappan’s and Van Vleck’s Functional Equations

Abstract We study the solutions of the integral Kannappan’s and Van Vleck’s functional equations ∫Sf(xyt)dµ(t)+∫Sf(xσ(y)t)dµ(t)= 2f(x)f(y), x,y ∈ S; ∫Sf(xσ(y)t)dµ(t)-∫Sf(xyt)dµ(t)= 2f(x)f(y), x,y ∈ S; where S is a semigroup, σ is an involutive automorphism of S and µ is a linear combination of Dirac measures ( ᵟ zi)I ∈ I, such that for all i ∈ I, ziis in the center of S. We show that the solutions of these equations are closely related to the solutions of the d’Alembert’s classic functional equation with an involutive automorphism. Furthermore, we obtain the superstability theorems for these functional equations in the general case, where σ is an involutive morphism.

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A Variant of D’alembert’s Matrix Functional Equation

Annales Mathematicae Silesianae ◽

10.2478/amsil-2020-0025 ◽

2020 ◽

Vol 0 (0) ◽

Author(s):

Youssef Aissi ◽

Driss Zeglami ◽

Mohamed Ayoubi

Keyword(s):

Functional Equation ◽

Functional Equations ◽

Topological Groups ◽

Involutive Automorphism ◽

Continuous Solutions ◽

Matrix Functional Equations

AbstractThe aim of this paper is to characterize the solutions Φ : G → M2(ℂ) of the following matrix functional equations {{\Phi \left( {xy} \right) + \Phi \left( {\sigma \left( y \right)x} \right)} \over 2} = \Phi \left( x \right)\Phi \left( y \right),\,\,\,\,\,\,x,y, \in G, and {{\Phi \left( {xy} \right) - \Phi \left( {\sigma \left( y \right)x} \right)} \over 2} = \Phi \left( x \right)\Phi \left( y \right),\,\,\,\,\,\,x,y, \in G, where G is a group that need not be abelian, and σ : G → G is an involutive automorphism of G. Our considerations are inspired by the papers [13, 14] in which the continuous solutions of the first equation on abelian topological groups were determined.

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Solutions and Stability of Generalized Mixed Type QCA-Functional Equations in Random Normed Spaces

Annals of the Alexandru Ioan Cuza University - Mathematics ◽

10.2478/v10157-012-0047-2 ◽

2013 ◽

Vol 59 (2) ◽

pp. 299-320

Author(s):

M. Eshaghi Gordji ◽

Y.J. Cho ◽

H. Khodaei ◽

M. Ghanifard

Keyword(s):

Functional Equation ◽

General Solution ◽

Functional Equations ◽

Mixed Type ◽

Additive Functional ◽

Normed Spaces ◽

Additive Functional Equation ◽

Probabilistic Normed Spaces ◽

Random Normed Spaces ◽

Generalized Stability

Abstract In this paper, we investigate the general solution and the generalized stability for the quartic, cubic and additive functional equation (briefly, QCA-functional equation) for any k∈ℤ-{0,±1} in Menger probabilistic normed spaces.

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Stability of a generalized n-variable mixed-type functional equation in fuzzy modular spaces

Journal of Inequalities and Applications ◽

10.1186/s13660-021-02594-y ◽

2021 ◽

Vol 2021 (1) ◽

Author(s):

Murali Ramdoss ◽

Divyakumari Pachaiyappan ◽

Choonkil Park ◽

Jung Rye Lee

Keyword(s):

Functional Equation ◽

Fixed Point ◽

General Solution ◽

Functional Equations ◽

Mixed Type ◽

Research Paper ◽

Fixed Point Method ◽

Quadratic Functional ◽

Ulam Stability ◽

Modular Spaces

AbstractThis research paper deals with general solution and the Hyers–Ulam stability of a new generalized n-variable mixed type of additive and quadratic functional equations in fuzzy modular spaces by using the fixed point method.

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The new investigation of the stability of mixed type additive-quartic functional equations in non-Archimedean spaces

Demonstratio Mathematica ◽

10.1515/dema-2020-0009 ◽

2020 ◽

Vol 53 (1) ◽

pp. 174-192

Author(s):

Anurak Thanyacharoen ◽

Wutiphol Sintunavarat

Keyword(s):

Functional Equation ◽

Normed Space ◽

Functional Equations ◽

Mixed Type ◽

Additive Group ◽

Ulam Stability ◽

Quartic Functional Equation ◽

The Stability

AbstractIn this article, we prove the generalized Hyers-Ulam stability for the following additive-quartic functional equation:f(x+3y)+f(x-3y)+f(x+2y)+f(x-2y)+22f(x)+24f(y)=13{[}f(x+y)+f(x-y)]+12f(2y),where f maps from an additive group to a complete non-Archimedean normed space.

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On alienation of two functional equations of quadratic type

Aequationes Mathematicae ◽

10.1007/s00010-021-00809-7 ◽

2021 ◽

Author(s):

Roman Ger

Keyword(s):

Functional Equation ◽

Functional Equations ◽

Quadratic Functional Equation ◽

Quadratic Functional ◽

Real Numbers ◽

Alpha Beta ◽

Beta 2 ◽

Special Case

Abstract We deal with an alienation problem for an Euler–Lagrange type functional equation $$\begin{aligned} f(\alpha x + \beta y) + f(\alpha x - \beta y) = 2\alpha ^2f(x) + 2\beta ^2f(y) \end{aligned}$$ f ( α x + β y ) + f ( α x - β y ) = 2 α 2 f ( x ) + 2 β 2 f ( y ) assumed for fixed nonzero real numbers $$\alpha ,\beta ,\, 1 \ne \alpha ^2 \ne \beta ^2$$ α , β , 1 ≠ α 2 ≠ β 2 , and the classic quadratic functional equation $$\begin{aligned} g(x+y) + g(x-y) = 2g(x) + 2g(y). \end{aligned}$$ g ( x + y ) + g ( x - y ) = 2 g ( x ) + 2 g ( y ) . We were inspired by papers of Kim et al. (Abstract and applied analysis, vol. 2013, Hindawi Publishing Corporation, 2013) and Gordji and Khodaei (Abstract and applied analysis, vol. 2009, Hindawi Publishing Corporation, 2009), where the special case $$g = \gamma f$$ g = γ f was examined.

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Algebraic functional equations and completely faithful Selmer groups

International Journal of Number Theory ◽

10.1142/s1793042115500670 ◽

2015 ◽

Vol 11 (04) ◽

pp. 1233-1257

Author(s):

Tibor Backhausz ◽

Gergely Zábrádi

Keyword(s):

Functional Equation ◽

Elliptic Curve ◽

Galois Group ◽

Number Field ◽

Functional Equations ◽

Complex Multiplication ◽

Selmer Groups ◽

Selmer Group ◽

Torsion Module ◽

Ordinary Reduction

Let E be an elliptic curve — defined over a number field K — without complex multiplication and with good ordinary reduction at all the primes above a rational prime p ≥ 5. We construct a pairing on the dual p∞-Selmer group of E over any strongly admissible p-adic Lie extension K∞/K under the assumption that it is a torsion module over the Iwasawa algebra of the Galois group G = Gal(K∞/K). Under some mild additional hypotheses, this gives an algebraic functional equation of the conjectured p-adic L-function. As an application, we construct completely faithful Selmer groups in case the p-adic Lie extension is obtained by adjoining the p-power division points of another non-CM elliptic curve A.

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Projective actions, invariant sigma-curves and quadratic functional equations

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100063416 ◽

1985 ◽

Vol 98 (2) ◽

pp. 195-212 ◽

Cited By ~ 1

Author(s):

Patrick J. McCarthy

Keyword(s):

Functional Equation ◽

Periodic Function ◽

Functional Equations ◽

Continuous Solution ◽

Quadratic Functional Equation ◽

Quadratic Functional ◽

Continuous Solutions ◽

Linear Map

AbstractThe quadratic functional equation f(f(x)) *–Tf(x) + Dx = 0 is equivalent to the requirement that the graph be invariant under a certain linear map The induced projective map is used to show that the equation admits a rich supply of continuous solutions only when L is hyperbolic (T2 > 4D), and then only when T and D satisfy certain further conditions. The general continuous solution of the equation is given explicitly in terms of either (a) an expression involving an arbitrary periodic function, function additions, inverses and composites, or(b) suitable limits of such solutions.

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An Analogue of the Wave Equation and Certain Related Functional Equations

Canadian Mathematical Bulletin ◽

10.4153/cmb-1969-109-6 ◽

1969 ◽

Vol 12 (6) ◽

pp. 837-846 ◽

Cited By ~ 15

Author(s):

John A. Baker

Keyword(s):

Functional Equation ◽

Wave Equation ◽

Functional Equations ◽

Geometric Interpretation ◽

Continuous Solutions ◽

Difference Analogue ◽

Image Position

Consider the functional equation(1)assumed valid for all real x, y and h. Notice that (1) can be written(2)a difference analogue of the wave equation, if we interpret etc., (i. e. symmetric h differences), and that (1) has an interesting geometric interpretation. The continuous solutions of (1) were found by Sakovič [5].

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Stability of a Functional Equation Deriving from Quadratic and Additive Functions in Non-Archimedean Normed Spaces

Abstract and Applied Analysis ◽

10.1155/2013/198018 ◽

2013 ◽

Vol 2013 ◽

pp. 1-10 ◽

Cited By ~ 2

Author(s):

Abasalt Bodaghi ◽

Sang Og Kim

Keyword(s):

Functional Equation ◽

Positive Integer ◽

General Solution ◽

Functional Equations ◽

Quadratic Functional Equation ◽

Quadratic Functional ◽

Ulam Stability ◽

Additive Functions ◽

Normed Spaces

We obtain the general solution of the generalized mixed additive and quadratic functional equationfx+my+fx−my=2fx−2m2fy+m2f2y,mis even;fx+y+fx−y−2m2−1fy+m2−1f2y,mis odd, for a positive integerm. We establish the Hyers-Ulam stability for these functional equations in non-Archimedean normed spaces whenmis an even positive integer orm=3.

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CONTRAPOSITIVE SYMMETRY OF DISTRIBUTIVE FUZZY IMPLICATIONS

International Journal of Uncertainty Fuzziness and Knowledge-Based Systems ◽

10.1142/s0218488502001880 ◽

2002 ◽

Vol 10 (supp01) ◽

pp. 135-147 ◽

Cited By ~ 19

Author(s):

MICHAŁ BACZYŃSKI

Keyword(s):

Functional Equation ◽

Functional Equations ◽

Strong Negation ◽

Fuzzy Implications ◽

Fuzzy Implication

Recently, we have examined the solutions of the system of the functional equations I(x, T(y, z)) = T(I(x, y), I(x, z)), I(x, I(y, z)) = I(T(x, y), z), where T : [0, 1]2 → [0, 1] is a strict t-norm and I : [0, 1]2 → [0, 1] is a non-continuous fuzzy implication. In this paper we continue these investigations for contrapositive implications, i.e. functions which satisfy the functional equation I(x, y) = I(N(y), N(x)), with a strong negation N : [0, 1] → [0, 1]. We show also the bounds for two classes of fuzzy implications which are connected with our investigations.

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