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dc.contributor.authorLu, Linzhangen_US
dc.contributor.authorWang, Tengen_US
dc.contributor.authorKuo, Yueh-Chengen_US
dc.contributor.authorLi, Ren-Cangen_US
dc.contributor.authorLin, Wen-Weien_US
dc.date.accessioned2019-04-03T06:37:10Z-
dc.date.available2019-04-03T06:37:10Z-
dc.date.issued2016-01-01en_US
dc.identifier.issn1064-8275en_US
dc.identifier.urihttp://dx.doi.org/10.1137/16M1063563en_US
dc.identifier.urihttp://hdl.handle.net/11536/133109-
dc.description.abstractIn the vibration analysis of high speed trains arises such a palindromic quadratic eigenvalue problem (PQEP) (lambda(2) A(T)+ lambda Q + A)z = 0, where A;Q is an element of C-nxn have special structures: both Q and A are m x m block matrices with each block being k x k (thus n = m x k), and Q is complex symmetric and tridiagonal block-Toeplitz, and A has only one nonzero block in the (1, m)th block position which is the same as the subdiagonal block of Q. This PQEP has eigenvalues 0 and infinity each of multiplicity (m - 1) k just by examining A, but it is its remaining 2k eigenvalues, usually nonzero and finite but with an extreme wide range in magnitude, that are of interest. The problem is notoriously difficult numerically. Earlier methods that seek to deflate eigenvalues 0 and infinity first often produce eigenvalues that are too inaccurate to be useful due to the large errors introduced in the deflation process. The solvent approach proposed by Guo and Lin in 2010 changed the situation because it can deliver sufficiently accurate eigenvalues. In this paper, we propose a fast algorithm along the line of the solvent approach. The theoretical foundation of our algorithm is the connection we establish here between this fast train PQEP and a k x k PQEP defined by the subblocks of A and Q without any computational work. This connection lends itself to a fast algorithm: solve the k x k PQEP and then use its eigenpairs to recover the eigenpairs for the original fast train PQEP. The so-called alpha-structured backward error analysis that preserves all possible structures in the fast train PQEP to the extreme is studied. Finally numerical examples are presented to show the effectiveness of the new fast algorithm.en_US
dc.language.isoen_USen_US
dc.subjectpalindromic quadratic eigenvalue problemen_US
dc.subjectPQEPen_US
dc.subjectfast trainen_US
dc.subjectnonlinear matrix equationen_US
dc.subjectsolvent approachen_US
dc.subjectdoubling algorithmen_US
dc.titleA FAST ALGORITHM FOR FAST TRAIN PALINDROMIC QUADRATIC EIGENVALUE PROBLEMSen_US
dc.typeArticleen_US
dc.identifier.doi10.1137/16M1063563en_US
dc.identifier.journalSIAM JOURNAL ON SCIENTIFIC COMPUTINGen_US
dc.citation.volume38en_US
dc.citation.issue6en_US
dc.citation.spage0en_US
dc.citation.epage0en_US
dc.contributor.department應用數學系zh_TW
dc.contributor.departmentDepartment of Applied Mathematicsen_US
dc.identifier.wosnumberWOS:000391853100014en_US
dc.citation.woscount2en_US
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