Symbolic computation of the index of quasilinear differential-algebraic equations

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Symbolic computation of the index of quasilinear differential-algebraic equations

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International Conference on Symbolic and Algebraic Computation archive
Proceedings of the 1996 international symposium on Symbolic and algebraic computation table of contents

Zurich, Switzerland

Pages: 196 - 203

Year of Publication: 1996

ISBN:0-89791-796-0

Author

G. Thomas

LMC/IMAG, 46 avenue F. Viallet, 38031 Grenoble CEDEX, France

Sponsors

SIGSAM: ACM Special Interest Group on Symbolic and Algebraic Manipulation
SIGNUM: ACM Special Interest Group on Numerical Mathematics

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 1, Downloads (12 Months): 11, Citation Count: 1

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references cited by index terms peer to peer

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REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

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	2	BI%ENAN, K , CAMPBELL, S., AND PETZOLD, L. Numemcal Solutwn of Inztzal-Value Problems zn Dzfferential-Algebrazc Equations. North- Holland, Amsterdam, 1989.
	3	Stephen L. Campbell , E. Griepentrog, Solvability of general differential algebraic equations, SIAM Journal on Scientific Computing, v.16 n.2, p.257-270, March 1995 [doi>10.1137/0916017]
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	8	Peter Kunkel , Volker Mehrmann, Canonical forms for linear differential-algebraic equations with variable coefficients, Journal of Computational and Applied Mathematics, v.56 n.3, p.225-251, Dec. 30, 1994 [doi>10.1016/0377-0427(94)90080-9]
	9	M. P. Quéré , G. Villard, An algorithm for the reduction of linear DAE, Proceedings of the 1995 international symposium on Symbolic and algebraic computation, p.223-231, July 10-12, 1995, Montreal, Quebec, Canada [doi>10.1145/220346.220374]
	10	RAPIER, P. J., AND RHEINBOLDT, W. C. A geometric treatment of implicit differential-algebraic equations. J. of D~flj'erent~al Equatzons 109 (1994), 110-146.
	11	Sebastian Reich, On an existence and uniqueness theory for nonlinear differential-algebraic equations, Circuits, Systems, and Signal Processing, v.10 n.3, p.343-359, 1991 [doi>10.1007/BF01187550]
	12	SZATKOWSKI, A Generalized dynamical systems: differentiable dynamic complexes and differential dynamic systems. International Journal of Systems Sciences 21, 8 (1990), 1631-57.
	13	SZATKOWSKI, A. Geometric characterization of singular differential algebraic equations. Internatzonal Journal of Systems Sciences 23, 2 (1992), I67-186.