Geul - Sinclair 's non - aggregate theorem - applied empirical study H*
In this paper, we generalized the Jewell-Sinclair theorem to include not only associative Banach algebra but also the nonassociative Banach algebra. Our methods in extend Jewell-Sinclair theorem is based on the theory of multiplication algebra of an arbitrary algebra and another techniques, which is...
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| Main Authors: | , |
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| Format: | Book |
| Published: |
College of Education for Pure Sciences,
2006-01-01T00:00:00Z.
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| Online Access: | Connect to this object online. |
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| Summary: | In this paper, we generalized the Jewell-Sinclair theorem to include not only associative Banach algebra but also the nonassociative Banach algebra. Our methods in extend Jewell-Sinclair theorem is based on the theory of multiplication algebra of an arbitrary algebra and another techniques, which is the standard method in the nonassociative context in the Spanish school.<br /> Furthermore, we give as an application example of our generalization for the Jewell-Sinclair theorem the well-known result proved by Rodriguez that assert the automatic continuity of a surjective homomorphisim on a nonassociative f f*- algebras, Our proof is based on essence the same lines of Rodriguez proof. |
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| Item Description: | 1812-125X 2664-2530 10.33899/edusj.2006.78714 |