Positive linear functionals on BP*-algebras
Abstract
Let A be a BP*-algebra with identity e, P1(A) be the set of all positive linear functionals f on A such that f(e) = 1, and let Ms(A) be the set of all nonzero hermitian multiplicative linear functionals on A. We prove that Ms(A) is the set of extreme points of P1(A). We also prove that, if Ms(A) is equicontinuous, then every positive linear functional on A is continuous. Finally, we give an example of a BP*-algebra whose topological dual is not included in the vector space generated by P1(A), which gives a negative answer to a question posed by M. A. Hennings.
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