Distance to regular elements and polar decompositions in a C*-algebra
Abstract
We show that the distance from an element of a C*-algebra to the set of regular elements is the infimum of the δ>0 for which the δ-cut-down of the element admits a polar decomposition within the algebra. This parallels results of Pedersen and Brown-Pedersen describing the distance to invertible and quasi-invertible elements through polar decompositions of cut-downs whose polar parts are unitaries or extreme partial isometries.
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