On regular $^*$-algebras of bounded linear operators: A new approach towards a theory of noncommutative Boolean algebras
Abstract: We study (von Neumann) regular $*$-subalgebras of $B(H)$, which we call R$*$-algebras. The class of R$*$-algebras coincides with that of "E$*$-algebras that are pre-C$*$-algebras" in the sense of Z. Sz\H{u}cs and B. Tak\'acs. We give examples, properties and questions of R$*$-algebras. We observe that the class of unital commutative R$*$-algebras has a canonical one-to-one correspondence with the class of Boolean algebras. This motivates the study of R$*$-algebras as that of noncommutative Boolean algebras. We explain that seemingly unrelated topics of functional analysis, like AF C$*$-algebras and incomplete inner product spaces, naturally arise in the investigation of R$*$-algebras. We obtain a number of interesting results on R$*$-algebras by applying various famous theorems in the literature.
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