| Authors: | Đorđević, Bogdan Dinčić, Nebojša |
Title: | Solving the Operator Equation AX-XB=C with Closed A and B | Journal: | Integral Equations and Operator Theory | Volume: | 90 | Issue: | 5 | Issue Date: | 1-Oct-2018 | Rank: | M22 | ISSN: | 0378-620X | DOI: | 10.1007/s00020-018-2473-3 | Abstract: | We solve the operator equation AX- XB= C, where A and B are closed operators whose point spectra intersect. We obtain sufficient conditions for the existence of solutions and provide a way of constructing them. As a corollary, we obtain a result that gives us new insight on the matrix equations of the form AX= XB, where A and B share non-zero eigenvalues. Afterwards, we illustrate our results on Sturm–Liouville operators. |
Keywords: | Closed operator | Sturm–Liouville problem | Sylvester equation | Publisher: | Springer Link | Project: | Functional analysis, stochastic analysis and applications |
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