Complex symmetric stabilizing solution of the matrix equation $X+A^{T}X^{-1}A=Q$

dc.contributor.authorGuo, Chun-Hua
dc.contributor.authorKuo, Yueh-Cheng
dc.contributor.authorLin, Wen-Wei
dc.date.accessioned2014-04-27T22:52:38Z
dc.date.available2014-04-27T22:52:38Z
dc.date.issued2011
dc.description.abstractWe study the matrix equation $X+A^{T}X^{-1}A=Q$, where $A$ is a complex square matrix and $Q$ is complex symmetric. Special cases of this equation appear in Green's function calculation in nano research and also in the vibration analysis of fast trains. In those applications, the existence of a unique complex symmetric stabilizing solution has been proved using advanced results on linear operators. The stabilizing solution is the solution of practical interest. In this paper we provide an elementary proof of the existence for the general matrix equation, under an assumption that is satisfied for the two special applications. Moreover, our new approach here reveals that the unique complex symmetric stabilizing solution has a positive definite imaginary part. The unique stabilizing solution can be computed efficiently by the doubling algorithm.en_US
dc.description.authorstatusFacultyen_US
dc.description.peerreviewyesen_US
dc.description.sponsorshipNSERC, NSC (Taiwan), NCTS (Taiwan)en_US
dc.identifier.citationLinear Algebra Appl.en_US
dc.identifier.urihttps://hdl.handle.net/10294/5263
dc.language.isoenen_US
dc.publisherElsevieren_US
dc.titleComplex symmetric stabilizing solution of the matrix equation $X+A^{T}X^{-1}A=Q$en_US
dc.typeArticleen_US

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