Complexity of irreducibility testing for a system of linear ordinary differential equations

Subscribe (Full Service)


	Search: The ACM Digital Library The Guide

	Feedback

Complexity of irreducibility testing for a system of linear ordinary differential equations

Full text

Pdf (568 KB)

Source

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

Tokyo, Japan

Pages: 225 - 230

Year of Publication: 1990

ISBN:0-201-54892-5

Author

D. Y. Grigoriev

Leningrad Department of Mathematical V. A. Steklov, Institute of Academy of Sciences of the USSR, Fontanka 27, Leningrad, 191011, USSR

Sponsor

SIGSAM: ACM Special Interest Group on Symbolic and Algebraic Manipulation

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 0, Downloads (12 Months): 5, Citation Count: 2

Additional Information:

abstract references cited by index terms collaborative colleagues peer to peer

Tools and Actions:	Request Permissions Review this Article Save this Article to a Binder Display Formats: BibTeX EndNote ACM Ref

DOI Bookmark:	Use this link to bookmark this Article: http://doi.acm.org/10.1145/96877.96932 What is a DOI?

ABSTRACT

Let a system of linear ordinary differential equations of the first order Y′ = AY be given, where A is n × n matrix over a field F(X), assume that the degree degX(A) < d and the size of any coefficient occurring in A is at most M. The system Y′ = AY is called reducible if it is equivalent (over the field F(X)) to a system Y&prime1 = A1Y1 with a matrix A1 of the form A1 = (A1,1 0) (A2,1 A2,2) An algorithm is described for testing irreducibility of the system with the running time exp(M(d2n)d2n).

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.

	BBH 88	Beukers, F., Brownawell, D. and Heckman, G., Siegel Normality, Ann. Math. 127 (1988), pp. 279-308.
	CG 83	Chistov, A. L. and Grigoriev, D. Yu., Subezponential-lime Solving $ysiems of Algebraic Equations, volumes i and II (1983), Preprints LOMI E-9-83 and E-10-83, Leningrad.
	CL 55	Coddington, E. and Levinson, N., Theory of Ordinary Differeniial Equations, McGraw- Hill, New York (1955).
	Gr 86	Grigoriev, D. 'flu., Computational Complexity in Polynomial Algebra, Proceedings of the International Congress of Mathematicians, volume 2, Berkeley (1986), pp. 1452- 1460.
	Gr 90	D. Yu. Grigor'ev, Complexity of factoring and calculating the GCD of linear ordinary differential operators, Journal of Symbolic Computation, v.10 n.1, p.7-37, July 1990 [doi>10.1016/S0747-7171(08)80034-X]
	Ka 57	Kaplanski, I., An Introduction to Differential Algebra, Hermann, Paris (1957).
	La 65	Lang, S., Algebra, Addison-Wesley, Reading (1905).
	Si 81	Singer, M., Liouvillean Solutions of n-th Order Homogeneous Linear Differential Equations, Amer. J. Math. 103 (1981), pp. 661- 682.

CITED BY 2

	Thomas Cluzeau, Factorization of differential systems in characteristic p, Proceedings of the 2003 international symposium on Symbolic and algebraic computation, p.58-65, August 03-06, 2003, Philadelphia, PA, USA
	M. A. Barkatou , E. Pflügel, On the equivalence problem of linear differential systems and its application for factoring completely reducible systems, Proceedings of the 1998 international symposium on Symbolic and algebraic computation, p.268-275, August 13-15, 1998, Rostock, Germany