Embedding C*-algebras into the Calkin algebra of p
Abstract
Let p∈(1,∞). We show that there is an isomorphism from any separable unital subalgebra of B(2)/K(2) onto a subalgebra of B(p)/K(p) that preserves the Fredholm index. As a consequence, every separable C*-algebra is isomorphic to a subalgebra of B(p)/K(p). Another consequence is the existence of operators on p that behave like the essentially normal operators with arbitrary Fredholm indices in the Brown-Douglas-Fillmore theory.
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