A Class of Functional Equations on a Locally Compact Group

Akkouchi, Mohamed; Bakali, Allal; Khalil, Idriss

doi:10.1112/s0024610798005961

Cited by 16 publications

(13 citation statements)

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“…In the same setup as ours Benson, Jenkins and Ratcliff [5,6,7] have found the bounded K-spherical functions on certain Gelfand pairs. For results on bounded spherical functions, also matrixvalued, on abelian groups see Chojnacki [8,9], and on generalized Gelfand pairs see Akkouchi, Bakali and Khalil [2]. For operator cosine functions with exponential type of growth see Niechwiej [21].…”

Section: Introductionmentioning

confidence: 99%

Functional equations and matrix-valued spherical functions

Stetkær

2005

Aequ. math.

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We show that any solution of a certain functional equation, generalizing such equations as Wilson's, Levi-Cività's, Gajda's and the sine addition equation, can be expressed in terms of a matrix-valued spherical function. We compute this matrix-valued function for solutions of various functional equations, and use it to solve the equations. (2000). 39B32 and 43A90. Mathematics Subject Classification

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Section: Introductionmentioning

confidence: 99%

Functional equations and matrix-valued spherical functions

Stetkær

2005

Aequ. math.

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“…Proof. Let ξ ∈ H. By the same way as in the proof of Theorem 2.2 in [1], we can suppose that the vector ξ is cyclic Let now ϕ(x) = Φ(x)ξ, ξ for all x ∈ G. For all x, y ∈ G we have K ϕ (x, y) = Φ(x)ξ, Φ(y)ξ . So that K ϕ is a positive definite kernel.…”

Section: Resultsmentioning

confidence: 99%

On the Operator-valued $μ$-cosine functions

Belaid,

Elhoucien

2017

Preprint

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Let (G, +) be a topological abelian group with a neutral element e and let µ : G −→ C be a continuous character of G. Let (H, •, • ) be a complex Hilbert space and let B(H) be the algebra of all linear continuous operators of H into itself. A continuous mapping Φ : G −→ B(H) will be called an operator-valued µ-cosine function if it satisfies both the µ-cosine equationand the condition Φ(e) = I, where I is the identity of B(H). We show that any hermitian operator-valued µ-cosine functions has the form2 where Γ : G −→ B(H) is a continuous multiplicative operator. As an application, positive definite kernel theory and W. Chojnacki's results on the uniformly bounded normal cosine operator are used to give explicit formula of solution of the cosine equation.

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“…Therefore, our approach provide a unified treatment of the superstability of Cauchy's, d'Alembert's, Wilson's, spherical type functional equations and others. For informations about these equations we refer to [1,2,5,11,[23][24][25].…”

Section: Introductionmentioning

confidence: 99%

Superstability problem for a large class of functional equations

2015

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This paper treats superstability problem of the generalized Wilson's equationwhere G is an arbitrary locally compact group, that need not be abelian, K is a compact subgroup of G, ω K is the normalized Haar measure of K , is a finite group of K -invariant morphisms of G, μ is a complex measure with compact support and f, g : G −→ C are continuous complex-valued functions. We dont impose any condition on the continuous function f . In addition, superstability problem for a large class of related functional equations are considered.

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A Class of Functional Equations on a Locally Compact Group

Cited by 16 publications

References 0 publications

Functional equations and matrix-valued spherical functions

Functional equations and matrix-valued spherical functions

On the Operator-valued $μ$-cosine functions

Superstability problem for a large class of functional equations

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