The Laurent expansion of pencils that are singular at the origin
暂无分享,去创建一个
[1] G. W. Stewart,et al. An updating algorithm for subspace tracking , 1992, IEEE Trans. Signal Process..
[2] Ed Anderson,et al. LAPACK users' guide - [release 1.0] , 1992 .
[3] P. Dooren,et al. An improved algorithm for the computation of Kronecker's canonical form of a singular pencil , 1988 .
[4] Ed Anderson,et al. LAPACK Users' Guide , 1995 .
[5] Nicholas J. Highham. A survey of condition number estimation for triangular matrices , 1987 .
[6] G. Golub. Matrix computations , 1983 .
[7] Uriel G. Rothblum,et al. Resolvent expansions of matrices and applications , 1981 .
[8] V. Klema. LINPACK user's guide , 1980 .
[9] P. Dooren. The Computation of Kronecker's Canonical Form of a Singular Pencil , 1979 .
[10] C. Langenhop. On the invertibility of a nearly singular matrix , 1973 .
[11] C. E. Langenhop,et al. The Laurent expansion for a nearly singular matrix , 1971 .