Change search
ReferencesLink to record
Permanent link

Direct link
On Reciprocal Equivalence of Stäckel Systems
Linköping University, Department of Science and Technology, Communications and Transport Systems. Linköping University, The Institute of Technology. (matematik)
Department of Physics, Adam Mickiewicz University, Poznan, Poland.
2012 (English)In: Studies in applied mathematics (Cambridge), ISSN 0022-2526, E-ISSN 1467-9590, Vol. 129, no 1, 26-50 p.Article in journal (Refereed) Published
Abstract [en]

In this paper we ivestigate Stäckel transforms between different classes of parameter-dependent Stäckel separable systems of the same dimension. We show that the set of all Stäckel systems of the same dimension splits to equivalence classes so that all members within the same class can be connected by a single Stäckel transform. We also give an explicit formula relating solutions of two Stäckel-related systems. These results show in particular that any two geodesic Stäckel systems are Stäckel equivalent in the sense that it is possible to transform one into another by a single Stäckel transform. We also simplify proofs of some known statements about multiparameter Stäckel transform.

Place, publisher, year, edition, pages
Wiley-Blackwell, 2012. Vol. 129, no 1, 26-50 p.
Keyword [en]
separation of variables, Stäckel systems, Stäckel transform
National Category
Other Mathematics
URN: urn:nbn:se:liu:diva-77689DOI: 10.1111/j.1467-9590.2011.00544.xISI: 000306009800002OAI: diva2:528467
Available from: 2012-06-07 Created: 2012-05-25 Last updated: 2012-08-30Bibliographically approved

Open Access in DiVA

fulltext(342 kB)180 downloads
File information
File name FULLTEXT02.pdfFile size 342 kBChecksum SHA-512
Type fulltextMimetype application/pdf

Other links

Publisher's full text

Search in DiVA

By author/editor
Marciniak, Krzysztof
By organisation
Communications and Transport SystemsThe Institute of Technology
In the same journal
Studies in applied mathematics (Cambridge)
Other Mathematics

Search outside of DiVA

GoogleGoogle Scholar
Total: 180 downloads
The number of downloads is the sum of all downloads of full texts. It may include eg previous versions that are now no longer available

Altmetric score

Total: 265 hits
ReferencesLink to record
Permanent link

Direct link