The block matrix representations for the quasi-projection pairs on Hilbert $C^*$-modules
Abstract: A quasi-projection pair consists of two operators $P$ and $Q$ acting on a Hilbert $C*$-module $H$, where $P$ is a projection and $Q$ is an idempotent satisfying $Q*=(2P-I)Q(2P-I)$, in which $Q*$ denotes the adjoint operator of $Q$, and $I$ is the identity operator on $H$. Such a pair is said to be harmonious if both $P(I-Q)$ and $(I-P)Q$ admit polar decompositions. The primary goal of this paper is to present the block matrix representations for a harmonious quasi-projection pair $(P,Q)$ on a Hilbert $C*$-module, and additionally to derive new block matrix representations for the matched projection, the range projection, and the null space projection of $Q$. Several applications of these newly obtained block matrix representations are also explored.
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