A note on the common spectral properties for bounded linear operators
Abstract
Let X and Y be Banach spaces, A\,:\,X→ Y and B,\,C\,:\,Y→ X be bounded linear operators. We prove that if A(BA)2=ABACA=ACABA=(AC)2A, then σ*(AC)\0\=σ*(BA)\0\ where σ* runs over a large of spectra originated by regularities.
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