Geometry of oblique projections

Abstract

Let A be a unital C*-algebra. Denote by P the space of selfadjoint projections of A. We study the relationship between P and the spaces of projections Pa determined by the different involutions #a induced by positive invertible elements a in A. The maps fp: P Pa sending p to the unique q in Pa with the same range as p and a: Pa P sending q to the unitary part of the polar decomposition of the symmetry 2q-1 are shown to be diffeomorphisms. We characterize the pairs of idempotents q, r in A with |q-r|<1 such that there exists a positive element a in A verifying that q, r are in Pa. In this case q and r can be joined by an unique short geodesic along the space of idempotents Q of A.

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