The structures and decompositions of symmetries involving idempotents
Abstract
Let H be a separable Hilbert space and P be an idempotent on H. We denote by P=\J: J=J=J-1 and JPJ=I-P\ and P=\J: J=J=J-1 and JPJ=I-P*\. In this paper, we first get that symmetries (2P-I)|2P-I|-1 and (P+P*-I)|P+P*-I|-1 are the same. Then we show that P≠ if and only if P≠. Also, the specific structures of all symmetries J∈P and J∈P are established, respectively. Moreover, we prove that J∈P if and only if -1J(2P-I)|2P-I|-1∈P.
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