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On Bounded Finite Potent Operators on arbitrary Hilbert Spaces

The aim of this work is to study the structure of bounded finite potent endomorphisms on Hilbert spaces. In particular, for these operators, an answer to the Invariant Subspace Problem is given and the main properties of its adjoint operator are offered. Moreover, for every bounded finite potent endomorphism we show that Tate's trace coincides with the Leray trace and with the trace defined by R. Elliott for Riesz Trace Class operators.

preprint2021arXivOpen access

Fernando Pablos Romo

math.OA math.FA

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Fernando Pablos Romo

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On Bounded Finite Potent Operators on arbitrary Hilbert Spaces

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