Existence and uniqueness of solutions to the operator Riccati equation. A geometric approach
Abstract
We introduce a new concept of unbounded solutions to the operator Riccati equation A1 X - X A0 - X V X + V = 0 and give a complete description of its solutions associated with the spectral graph subspaces of the block operator matrix B = pmatrix A0 & V V & A1 pmatrix. We also provide a new characterization of the set of all contractive solutions under the assumption that the Riccati equation has a contractive solution associated with a spectral subspace of the operator B. In this case we establish a criterion for the uniqueness of contractive solutions.
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