The algebra of thin measurable operators is directly finite
Abstract
Let M be a semifinite von Neumann algebra on a Hilbert space H equipped with a faithful normal semifinite trace τ, S(M,τ) be the *-algebra of all τ-measurable operators. Let S0(M,τ) be the *-algebra of all τ-compact operators and T(M,τ)=S0(M,τ)+CI be the *-algebra of all operators X=A+λ I with A∈ S0(M,τ) and λ ∈ C. We prove that every operator of T(M,τ) that is left-invertible in T(M,τ) is in fact invertible in T(M,τ). It is a generalization of Sterling Berberian theorem (1982) on the subalgebra of thin operators in B (H). For the singular value function μ(t; Q) of Q=Q2∈ S(M,τ) we have μ(t; Q)∈ \0\ [1, +∞) for all t>0. It gives the positive answer to the question posed by Daniyar Mushtari in 2010.
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