Isaak Chagouel, Michael Stessin, Kehe Zhu
Published 2013-09-17Version 1
We introduce a notion of joint spectrum for a tuple of compact operators on a separable Hilbert space and show that in many situations these operators commute if and only if the joint spectrum consists of countably many, locally finite, complex hyperplanes. In particular, we show that normal matrices (of the same size) $A_1,\cdots,A_n$ commute if and only if the polynomial $\det(z_1A_1+\cdots+z_nA_n+I)$ is completely reducible, that is, it can be factored into a product of linear polynomials.
Joint spectra of representations of Lie algebras by compact operators
Khinchin's inequality, Dunford--Pettis and compact operators on the space $\pmb{C([0,1],X)}$
Some remarks on "Geometric spectral theory for compact operators"
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