Abstract
Given a complex Krein space H with fundamental symmetry J, the aim of this note is to characterize the set of J-normal projections Q = {Q ∈ L(H): Q2 and Q#Q = QQ#}. The ranges of the projections in Q are exactly those subspaces of H which are pseudo-regular. For a fixed pseudo-regular subspace S, there are infinitely many J-normal projections onto it, unless S is regular. Therefore, most of the material herein is devoted to parametrizing the set of J-normal projections onto a fixed pseudo-regular subspace S. © 2013 Springer Basel.
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Maestripieri, A., & Martínez Pería, F. (2013). Normal Projections in Krein Spaces. Integral Equations and Operator Theory, 76(3), 357–380. https://doi.org/10.1007/s00020-013-2063-3
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