Abstract
For any complex valued functions over any topological space F there exists a relation in von Neumann algebras of *-graded that is bounded on compact Hausdorff where for category- I, II, III there exists a commutative form of ã??AWã??^* algebras such that to satisfy a monotone complete C^* algebra suffice an isomorphic factor f on the same ã??AWã??^* tamed as W^* having the generators η for a generic group η(G) for 2-groups G_ and G_- for the former being additive integers generating the later free group for ã??AWã??^* algebras where compact Hausdorff CH a Borel measure β exists in compact set C norms the associated Hausdorff space over a locally finite Ï?-algebra via β(C)â??â??.
Keywords
Commutative algebra, Operator theory, Hilbert space. Mathematical subject Classification (MSC) â?? primary (13-XX, 52-XX), secondary (13-11, 52B20)
DOI
View DOI - (https://doi.org/10.36713/epra11269)
How to Cite:
Deep Bhattacharjee , GENERATORS OF BOREL MEASURABLE COMMUTATIVE ALGEBRA ON COMPACT HAUSDORFF TAKING VON NEUMANN AW*OVER*-ISOMORPHISM , Volume 7 , Issue 9, september 2022, EPRA International Journal of Research & Development (IJRD), DOI: https://doi.org/10.36713/epra11269