ON BOUNDEDNESS AND CONTNUITY OF JORDAN, ORDINARY AND QUADRATIC PRODUCT IN ALTERNATIVE SEMI-PRIME ALGEBRAS

Authors

  • A. Tajmouati Sidi Mohamed Ben Abdellah University - Faculty of Sciences

Keywords:

bornological algebras, boundedness, Jordan product, quadratic product, derivation, alternative semi-prime algebra, Mackey-convergence, separating space, net in bornological space

Abstract

In this work we prove that, if A is an alternative semi-prime algebra, which is considered as a complete convex bornological vector space (respectively, completely bornological locally convex space) and its bornology has a net, then there is equivalent between separating boundedness (resp. separating continuity) of Jordan, ordinary product and quadratic product. If A is again topological, then the boundedness is global and if A is Fr´echet space, there is an equivalence between the continuity of these three products.

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Published

2013-05-24

How to Cite

Tajmouati, A. (2013). ON BOUNDEDNESS AND CONTNUITY OF JORDAN, ORDINARY AND QUADRATIC PRODUCT IN ALTERNATIVE SEMI-PRIME ALGEBRAS. Italian Journal of Pure and Applied Mathematics, 30, 269–278. Retrieved from https://journals.uniurb.it/index.php/ijpam/article/view/6080

Issue

Section

Articoli - Forum Editrice

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