A note on positive deniteness and stability of interval matrices

Veiseh, Hana

رقم المقالة : 514454 زيارة : 210 الصفحة: 105 - 113

نوع المخطوط: ابحاث

A note on positive deniteness and stability of interval matrices

الموضوعات :

Hana Veiseh ¹

1 - Department of Applied Mathematics, Hamedan Branch, Islamic Azad University, Hamedan, Iran

تاريخ الإرسال : 08 الإثنين , شعبان, 1434 تاريخ التأكيد : 18 الخميس , ربيع الثاني, 1434 تاريخ الإصدار : 12 الجمعة , رجب, 1436

الکلمات المفتاحية: Stability, Interval matrix, Real eigenvalues, Positive deniteness, Symmetric matrix,

ملخص المقالة :

It is proved that by using bounds of eigenvalues of an interval matrix, someconditions for checking positive deniteness and stability of interval matricescan be presented. These conditions have been proved previously with variousmethods and now we provide some new proofs for them with a unity method.Furthermore we introduce a new necessary and sucient condition for checkingstability of interval matrices.

المصادر:

[1] J. Rohn, Checking positive deniteness or stability of symmetric
interval matrices is NP-hard, Commentationes Mathematicae
Universitatis Carolinae. 35 (1994) 795{797.
[2] J. Rohn, Checking properties of interval matrices, Technical Report
686, Institute of Computer Science, Academy of Sciences of the
Czech Republic, Prague, September 1996.
[3] R. Farhadsefat, T. Lot, J. Rohn, A note on regularity and positive
deniteness of interval matrices, Cent. Eur. J. Math. 10(1) (2012)
322{328.
[4] M. Mansour, Robust stability of interval matrices, Proceeding of the
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[5] J. Rohn, A Handbook of Results on Interval Linear Problems,
Prague: Czech Academy of Sciences, 2005.
[6] J. Rohn, Positive deniteness and stability of interval matrices,
SIAM J. Matrix Anal. Appl. 15(1) (1994) 175{184.
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[9] M. Hladik, D. Daney, E. P. Tsigaridas, Bounds on real eigenvalues
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[10] J. Rohn, Bounds on eigenvalues of interval matrices, ZAMM, Z.
Angew. Math. Mech. 78(Suppl. 3) (1998) S1049{S1050.
[11] J. Rohn, Interval matrices: Singularity and real eigenvalues, SIAM
Journal on Matrix Analysis and Applications. 14(1) (1993) 82{91.
[12] J. Rohn, A. Deif, On the range of eigenvalues of an interval matrix,
Comput. 47(3-4) (1992) 373{377.
[13] R. A. Horn and C. R. Johnson, Matrix Analysis, Cambridge:
Cambridge University Press, 1985.
[14] J. Stoer and R. Bulrisch, Introduction to Numerical Analysis,
Springer-Verlag, Berlin, 1980.

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A note on positive deniteness and stability of interval matrices

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عنوان URL للمقالة

A note on positive de niteness and stability of interval matrices

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الصفحات الرسمية

A note on positive deniteness and stability of interval matrices