Stiffness detection and estimation of dominant spectrum with explicit Runge-Kutta methods

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Stiffness detection and estimation of dominant spectrum with explicit Runge-Kutta methods

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ACM Transactions on Mathematical Software (TOMS) archive
Volume 24 , Issue 4 (December 1998) table of contents

Pages: 368 - 382

Year of Publication: 1998

ISSN:0098-3500

Authors

Kersti Ekeland	The Norwegian University of Science and Technology
Brynjulf Owren	The Norwegian University of Science and Technology
Eivor Øines	The Norwegian University of Science and Technology

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 6, Downloads (12 Months): 39, Citation Count: 0

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ABSTRACT

A new stiffness detection scheme based on explicit Runge-Kutta methods is proposed. It uses a Krylov subspace approximation to estimate the eigenvalues of the Jacobian of the differential system. The numerical examples indicate that this technique is a worthwhile alternative to other known stiffness detection schemes, especially when the systems are large and when it is desirable to know more about the spectrum of the Jacobian than just the spectral radius.

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.

	1	CURTISS, C. AND HIRSCHFELDER, J. 1952. Integration of stiff equations. Proc. National Acad. Sci. U.S. 38, 235-243.
	2	DEKKER, K. AND VERWER, J. 1984. Runge-Kutta Methods for Stiff Nonlinear Differential Equations. North-Holland.
	3	EKELAND, K. AND ~INES, E. 1996. Detecting stiffness in explicit Runge-Kutta methods. Term Project, NTNU, Norway.
	4	GOLUB, G. H. AND LOAN, C. F.V. 1983. Matrix Computations. Oxford.
	5	E. Hairer , S. P. Nørsett , G. Wanner, Solving ordinary differential equations I (2nd revised. ed.): nonstiff problems, Springer-Verlag New York, Inc., New York, NY, 1993
	6	HIGHAM, D. AND TREFETHEN, L. 1993. Stiffness of ODE's. BIT 33, 285-303.
	7	J. D. Lambert, Numerical methods for ordinary differential systems: the initial value problem, John Wiley & Sons, Inc., New York, NY, 1991
	8	ROBERTSON, B. 1987. Detecting stiffness with explicit runge-kutta methods. Technical Report 193/87, University of Toronto.
	9	SAAD, Y. 1992. Numerical Methods For Large Eigenvalue Problems. Manchester University Press.
	10	L. F. Shampine, Stiffness and Nonstiff Differential Equation Solvers, II: Detecting Stiffness with Runge-Kutta Methods, ACM Transactions on Mathematical Software (TOMS), v.3 n.1, p.44-53, March 1977 [doi>10.1145/355719.355722]
	11	SHAMPINE, L. 1980. Lipschitz constants and robust ODE codes. In Computational Methods in Nonlinear Mechanics. North-Holland, 427-449.
	12	Lawrence F. Shampine, Diagnosing stiffness for Runge-Kutta methods, SIAM Journal on Scientific and Statistical Computing, v.12 n.2, p.260-272, March 1991 [doi>10.1137/0912015]
	13	Kim-Chuan Toh , Lloyd N. Trefethen, Calculation of pseudospectra by the Arnoldi iteration, SIAM Journal on Scientific Computing, v.17 n.1, p.1-15, Jan. 1996 [doi>10.1137/0917002]

INDEX TERMS

Primary Classification:
G. Mathematics of Computing
G.1 NUMERICAL ANALYSIS
G.1.7 Ordinary Differential Equations
Subjects: Initial value problems

General Terms:
Algorithms

Keywords:
explicit Runge-Kutta method, stiffness detection

REVIEW

"Lawrence Shampine : Reviewer"

The authors attempt to recognize when an initial-value problem for a system of ordinary differential equations is stiff by approximating the dominant eigenvalues of local Jacobians. They use Arnoldi more...

Collaborative Colleagues:

Kersti Ekeland: colleagues

Brynjulf Owren: colleagues

Eivor Øines: colleagues

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