On masas of the Calkin algebra generated by projections
Abstract
Assuming the continuum hypothesis CH, we obtain complete *-isomorphic classification of maximal abelian self-adjoint subalgebras (masas) of the Calkin algebra Q(2) (bounded operators on a separable Hilbert space modulo compact operators) generated by projections. In particular, for any compact totally disconnected Hausdorff space K of weight not exceeding the continuum and not admitting Gδ points we construct under CH a masa of Q(2) which is *-isomorphic to the algebra C(K) of complex-valued continuous functions on K. This, among others, shows that masas of the Calkin algebra could have rather unexpected properties compared to the previously known three *-isomorphic types of them generated by projections: ∞/c0, L∞ and ∞/c0 L∞. It can be shown that some additional set-theoretic hypothesis, like CH, is necessary for such results. However, without making any additional set-theoretic assumptions we still construct a family of maximal possible cardinality (of the power set of R) of pairwise non-*-isomorphic masas of Q(2) generated by projections and with properties unlike the three above examples.
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