The Fixed Point Property of a Banach Algebra Generated by an Element with Infinite Spectrum
© 2018 P. Thongin and W. Fupinwong. A Banach space X is said to have the fixed point property if for each nonexpansive mapping T:E→E on a bounded closed convex subset E of X has a fixed point. Let X be an infinite dimensional unital Abelian complex Banach algebra satisfying the following: (i) condit...
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th-cmuir.6653943832-588252018-09-05T04:33:10Z The Fixed Point Property of a Banach Algebra Generated by an Element with Infinite Spectrum P. Thongin W. Fupinwong Mathematics © 2018 P. Thongin and W. Fupinwong. A Banach space X is said to have the fixed point property if for each nonexpansive mapping T:E→E on a bounded closed convex subset E of X has a fixed point. Let X be an infinite dimensional unital Abelian complex Banach algebra satisfying the following: (i) condition (A) in Fupinwong and Dhompongsa, 2010, (ii) if x,yϵX is such that τx≤τy, for each τϵΩ(X), then x≤y, and (iii) inf{r(x):xϵX,x=1}>0. We prove that there exists an element x0 in X such that 〈x0〉R=i=1kμix0i:kϵN,μiϵR does not have the fixed point property. Moreover, as a consequence of the proof, we have that, for each element x0 in X with infinite spectrum and σ(x0)⊂R, the Banach algebra 〈x0〉=i=1kμix0i:kϵN,μiϵC generated by x0 does not have the fixed point property. 2018-09-05T04:33:10Z 2018-09-05T04:33:10Z 2018-01-01 Journal 23148888 23148896 2-s2.0-85049353516 10.1155/2018/9045790 https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=85049353516&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/58825 |
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Mathematics P. Thongin W. Fupinwong The Fixed Point Property of a Banach Algebra Generated by an Element with Infinite Spectrum |
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© 2018 P. Thongin and W. Fupinwong. A Banach space X is said to have the fixed point property if for each nonexpansive mapping T:E→E on a bounded closed convex subset E of X has a fixed point. Let X be an infinite dimensional unital Abelian complex Banach algebra satisfying the following: (i) condition (A) in Fupinwong and Dhompongsa, 2010, (ii) if x,yϵX is such that τx≤τy, for each τϵΩ(X), then x≤y, and (iii) inf{r(x):xϵX,x=1}>0. We prove that there exists an element x0 in X such that 〈x0〉R=i=1kμix0i:kϵN,μiϵR does not have the fixed point property. Moreover, as a consequence of the proof, we have that, for each element x0 in X with infinite spectrum and σ(x0)⊂R, the Banach algebra 〈x0〉=i=1kμix0i:kϵN,μiϵC generated by x0 does not have the fixed point property. |
| format |
Journal |
| author |
P. Thongin W. Fupinwong |
| author_facet |
P. Thongin W. Fupinwong |
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P. Thongin |
| title |
The Fixed Point Property of a Banach Algebra Generated by an Element with Infinite Spectrum |
| title_short |
The Fixed Point Property of a Banach Algebra Generated by an Element with Infinite Spectrum |
| title_full |
The Fixed Point Property of a Banach Algebra Generated by an Element with Infinite Spectrum |
| title_fullStr |
The Fixed Point Property of a Banach Algebra Generated by an Element with Infinite Spectrum |
| title_full_unstemmed |
The Fixed Point Property of a Banach Algebra Generated by an Element with Infinite Spectrum |
| title_sort |
fixed point property of a banach algebra generated by an element with infinite spectrum |
| publishDate |
2018 |
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https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=85049353516&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/58825 |
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