Skip to main content

News about Scitation

In December 2016 Scitation will launch with a new design, enhanced navigation and a much improved user experience.

To ensure a smooth transition, from today, we are temporarily stopping new account registration and single article purchases. If you already have an account you can continue to use the site as normal.

For help or more information please visit our FAQs.

banner image
No data available.
Please log in to see this content.
You have no subscription access to this content.
No metrics data to plot.
The attempt to load metrics for this article has failed.
The attempt to plot a graph for these metrics has failed.
The full text of this article is not currently available.
/content/aip/journal/chaos/16/4/10.1063/1.2357333
1.
1.Fenichel, N. (1979). “Geometric singular perturbation theory for ordinary differential equations,” J. Differ. Equations 31, 5398.
http://dx.doi.org/10.1016/0022-0396(79)90152-9
2.
2.Kaper, H. G. , and Kaper, T. J. (2002). “Asymptotic analysis of two reduction methods for systems of chemical reactions,” Physica D 165, 6693.
http://dx.doi.org/10.1016/S0167-2789(02)00386-X
3.
3.Maas, U. , and Pope, S. B. (1992). “Simplifying chemical kinetics: Intrinsic low dimensional manifolds in compositional space,” Combust. Flame 88, 239264.
http://dx.doi.org/10.1016/0010-2180(92)90034-M
4.
4.Rhodes, C. , Morari, M. , and Wiggins, S. (1999). “Identification of low order manifolds: Validating the algorithm of Maas and Pope,” Chaos 9, 108123.
http://dx.doi.org/10.1063/1.166398
http://aip.metastore.ingenta.com/content/aip/journal/chaos/16/4/10.1063/1.2357333
Loading
/content/aip/journal/chaos/16/4/10.1063/1.2357333
Loading

Data & Media loading...

Loading

Article metrics loading...

/content/aip/journal/chaos/16/4/10.1063/1.2357333
2006-10-20
2016-12-07