On the norm-preservation of squares in real algebra representation
One of the main results of the article Gelfand theory for real Banach algebras, recently published in [Rev R Acad Cienc Exactas Fís Nat Ser A Mat RACSAM 114(4):163, 2020] is Proposition 4.1, which establishes that the norm inequality ||a2||≤ ||a2+ b2|| for a, b∈ A is sufficient for a commutative rea...
| Autores: | , , |
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| Tipo de documento: | artigo |
| Estado: | Versão publicada |
| Data de publicação: | 2021 |
| País: | España |
| Recursos: | Universidad Pública de Navarra |
| Repositório: | Academica-e. Repositorio Institucional de la Universidad Pública de Navarra |
| OAI Identifier: | oai:academica-e.unavarra.es:2454/41496 |
| Acesso em linha: | https://hdl.handle.net/2454/41496 |
| Access Level: | Acceso aberto |
| Palavra-chave: | C(K)-space Gelfand theory Real algebra homomorphism Real commutative Banach algebra Representation of algebras |
| Resumo: | One of the main results of the article Gelfand theory for real Banach algebras, recently published in [Rev R Acad Cienc Exactas Fís Nat Ser A Mat RACSAM 114(4):163, 2020] is Proposition 4.1, which establishes that the norm inequality ||a2||≤ ||a2+ b2|| for a, b∈ A is sufficient for a commutative real Banach algebra A with a unit to be isomorphic to the space CR(K) of continuous real-valued functions on a compact Hausdorff space K. Moreover, in this proposition is also shown that if the above condition (which involves all the operations of the algebra) holds, then the real-algebra isomorphism given by the Gelfand transform preserves the norm of squares. A very natural question springing from the above-mentioned result is whether an isomorphism of A onto CR(K) is always norm-preserving of squares. This note is devoted to providing a negative answer to this problem. To that end, we construct algebra norms on spaces CR(K) which are (1 + ϵ) -equivalent to the sup-norm and with the norm of the identity function equal to 1, where the norm of every nonconstant function is different from the standard sup-norm. We also provide examples of two-dimensional normed real algebras A where ||a2|| ≤ k|| a2+ b2|| for all a, b∈ A, for some k>1 , but the inequality fails for k= 1. |
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