A Riesz-Fredholm type theorem on certain Hilbert C*-modules
Abstract
Let C be compact modular operator on a Hilbert C*-module E satisfying property [H] [ J. Math. Phys. 49 (2008), 033519], and let L :=I-C. We prove the existence of a unique natural number r for which Lr is an EP operator on E. Moreover, we show that the kernel of Lr is a finitely generated submodule of E and that E admits the decomposition E=Ker(Lr) Ran(Lr). These results provide a framework for analyzing the solvability of the equation x-Cx=f on E.
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