On orthomorphism elements in ordered algebra
Authors : Bahri TURAN, Hüma GÜRKÖK
Pages : 403-408
Doi:10.3906/mat-1911-28
View : 10 | Download : 7
Publication Date : 0000-00-00
Article Type : Research Paper
Abstract :Let C be an ordered algebra with a unit e. The class of orthomorphism elements Orthe C of C was introduced and studied by Alekhno in ”The order continuity in ordered algebras”. If C = L G , where G is a Dedekind complete Riesz space, this class coincides with the band Orth G of all orthomorphism operators on G. In this study, the properties of orthomorphism elements similar to properties of orthomorphism operators are obtained. Firstly, it is shown that if C is an ordered algebra such that Cr , the set of all regular elements of C , is a Riesz space with the principal projection property and Orthe C is topologically full with respect to Ie , then Be = Orthe C holds, where Be is the band generated by e in Cr . Then, under the same hypotheses, it is obtained that Orthe C is an f -algebra with a unit e.Keywords : Ordered algebra, orthomorphism elements, orthomorphism, f algebra