The absolute values and support projections for a class of operator matrices involving idempotents

Abstract

Let λ∈ R, μ∈ R and B be a linear bounded operator from a Hilbert space K into another Hilbert space H. In this paper, we consider the formulas of the absolute value |Qλ,μ|, where Qλ,μ with respect to the decomposition H have the operator matrix form Qλ,μ:=(arrayccλ I&B\*&μ Iarray). Then the positive part and the support projection of Qλ,0 are obtained. Also, we characterize the symmetry J such that a projection E is the J-projection. In particular, the minimal element of the set of all symmetries J with the property JE≥slant0 is described.