Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
4602287 | Linear Algebra and its Applications | 2009 | 13 Pages |
Abstract
Let (H,J) be a Krein space with selfadjoint involution J. Starting with a canonical representation of a J-selfadjoint projection, J-projection in short, as the sum of a J-positive projection and a J-negative one we study in detail the structure of a regular subspace, that is, the range of a J-projection. We treat the problem when the sum of two regular subspaces is again regular. We also treat the problem when the closure of the range of the product of a J-contraction and a J-expansion becomes regular.
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