SOLUTIONS AND STABILITY OF A GENERALIZATION OF WILSON'S EQUATION

In this paper we study the solutions and stability of the generalized Wilson's functional equation fc f(xty)dtt(t) + fc f(xtσ(y))dtt(t) =2f(x)g(y), x,y C G, where G is a locally compact group, a is a continuous involution of G and # is an idempotent complex measure with compact support and which is...

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Bibliographic Details
Published in:数学物理学报:B辑英文版 2016 (3), p.791-801
Main Author: Bouikhalene BELAID Elqorachi ELHOUCIEN
Format: Article
Language:English
Subjects:
DTT
FCG
Wilson方程
一般形式
函数方程
局部紧群
泛函方程
稳定性定理
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Summary:In this paper we study the solutions and stability of the generalized Wilson's functional equation fc f(xty)dtt(t) + fc f(xtσ(y))dtt(t) =2f(x)g(y), x,y C G, where G is a locally compact group, a is a continuous involution of G and # is an idempotent complex measure with compact support and which is a-invariant. We show that ∫Gg(xty)dp(t) + fcg(xta(y))dp(t) = 2g(x)g(y) if f = 0 and fcf(t.)dp(t) =0, where [fcf(t.)dp(t)](x) = fc f(tx)dμ(t). We also study some stability theorems of that equation and we establish the stability on noncommutative groups of the classical Wilson's functional equation f(xy) + X(y)f(xa(y)) = 2f(x)g(y) x, y C G, where X is a unitary character of G.
ISSN:0252-9602
1572-9087