Open AccessOn Pre-Hilbert Noncommutative Jordan Algebras Satisfying
Author(s) -
M. Benslimane,
Abdelhadi Moutassim
Publication year - 2012
Publication title -
isrn algebra
Language(s) - English
Resource type - Journals
eISSN - 2090-6293
pISSN - 2090-6285
DOI - 10.5402/2012/328752
Subject(s) - mathematics , noncommutative geometry , jordan algebra , algebra over a field , algebra representation , pure mathematics , zero (linguistics) , norm (philosophy) , cellular algebra , vector space , division algebra , noncommutative algebraic geometry , filtered algebra , associative algebra , noncommutative quantum field theory , linguistics , philosophy , political science , law
Let be a real or complex algebra. Assuming that a vector space is endowed with a pre-Hilbert norm satisfying for all . We prove that is finite dimensional in the following cases. (1) is a real weakly alternative algebra without divisors of zero. (2) is a complex powers associative algebra. (3) is a complex flexible algebraic algebra. (4) is a complex Jordan algebra. In the first case is isomorphic to or and is isomorphic to in the last three cases. These last cases permit us to show that if is a complex pre-Hilbert noncommutative Jordan algebra satisfying for all , then is finite dimensional and is isomorphic to . Moreover, we give an example of an infinite-dimensional real pre-Hilbert Jordan algebra with divisors of zero and satisfying for all .
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