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http://dx.doi.org/10.4134/BKMS.2006.43.2.309

GENERALIZED STABILITY OF ISOMETRIES ON REAL BANACH SPACES  

Lee, Eun-Hwi (DEPARTMENT OF MATHEMATICS, JEONJU UNIVERSITY)
Park, Dal-Won (DEPARTMENT OF MATHEMATICS EDUCATION, KONGJU NATIONAL UNIVERSITY)
Publication Information
Bulletin of the Korean Mathematical Society / v.43, no.2, 2006 , pp. 309-318 More about this Journal
Abstract
Let X and Y be real Banach spaces and ${\varepsilon}\;>\;0$, p > 1. Let f : $X\;{\to}\;Y$ be a bijective mapping with f(0) = 0 satisfying $$|\;{\parallel}f(x)-f(y){\parallel}-{\parallel}{x}-y{\parallel}\;|\;{\leq}{\varepsilon}{\parallel}{x}-y{\parallel}^p$$ for all $x\;{\in}\;X$ and, let $f^{-1}\;:\;Y\;{\to}\;X$ be uniformly continuous. Then there exist a constant ${\delta}\;>\;0$ and N(${\varepsilon},p$) such that lim N(${\varepsilon},p$)=0 and a unique surjective isometry I : X ${\to}$ Y satisfying ${\parallel}f(x)-I(x){\parallel}{\leq}N({\varepsilon,p}){\parallel}x{\parallel}^p$ for all $x\;{\in}\;X\;with\;{\parallel}x{\parallel}{\leq}{\delta}$.
Keywords
(${\varepsilon}$,p)-isometry; isometry; real Banach spaces;
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