On Sylvester equations in Banach subalgebras

Abstract

Let B be a Banach algebra and A be a Banach subalgebra that admits norm-controlled inversion in B. In this work, we take A, B in the Banach subalgebra A with their spectra in the Banach algebra B being disjoint, and show that the operator Sylvester equation BX-XA=Q has a unique solution X∈ A for every Q∈ A. Under the additional assumptions that B is the operator algebra B(H) on a Hilbert space H and that A and B are normal in B(H), an explicit norm estimate for the solution X of the above operator Sylvester equation is provided in this work. In addition, the above conclusion on norm control is applied to Banach subalgebras of localized infinite matrices and integral operators.

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