Voß, HeinrichHeinrichVoßElssel, KoljaKoljaElssel2006-02-142006-02-142006-01Preprint. Published in Archive of Applied Mechanics. November 2006, Volume 76, Issue 3–4, pp 171–179http://tubdok.tub.tuhh.de/handle/11420/118Simulating numerically the sound radiation of a rolling tire requires the solution of a very large and sparse gyroscopic eigenvalue problem. Taking advantage of the automated multi– level substructuring (AMLS) method it can be projected to a much smaller gyroscopic problem, the solution of which however is still quite costly since the eigenmodes are non–real and complex arithmetic is necessary. This paper discusses the application of AMLS to huge gyroscopic problems and the numerical solution of the AMLS reduction. A numerical example demonstrates the efficiency of AMLS.enhttp://rightsstatements.org/vocab/InC/1.0/EigenvalueAMLSgyroscopic eigenproblemsubstructuringnonlinear eigenproblemMathematikPreprint2006-02-15urn:nbn:de:gbv:830-opus-174910.15480/882.116Nichtlineares EigenwertproblemSparse matricesEigenvalues, eigenvectors11420/11810.1007/s00419-006-0013-010.15480/882.116930768010Other