Conference item icon

Conference item

Local truncation error of low-order fractional variational integrators

Abstract:
We study the local truncation error of the so-called fractional variational integrators, recently developed in based on previous work by Riewe and Cresson. These integrators are obtained through two main elements: the enlarging of the usual mechanical Lagrangian state space by the introduction of the fractional derivatives of the dynamical curves; and a discrete restricted variational principle, in the spirit of discrete mechanics and variational integrators. The fractional variational integrators are designed for modelling fractional dissipative systems, which, in particular cases, reduce to mechanical systems with linear damping. All these elements are introduced in the paper. In addition, as original result, we prove (Sect. 3, Theorem 2) the order of local truncation error of the fractional variational integrators with respect to the dynamics of mechanical systems with linear damping.
Publication status:
Published
Peer review status:
Peer reviewed

Actions

Access Document

Files:
Publisher copy:
10.1007/978-3-030-26980-7_56

Authors

More by this author
Institution:
University of Oxford
Division:
MPLS
Department:
Engineering Science
Role:
Author
More by this author
Institution:
University of Oxford
Division:
MPLS
Department:
Engineering Science
Role:
Author


Publisher:
Springer
Pages:
541-548
Series:
Lecture Notes in Computer Science
Series number:
11712
Publication date:
2019-08-02
Acceptance date:
2019-06-04
Event title:
4th International Conference of Geometric Science of Information (GSI 2019)
Event series:
Image Processing, Computer Vision, Pattern Recognition, and Graphics Sub-Series
Event location:
Toulouse, France
Event website:
https://www.see.asso.fr/en/GSI2019
Event start date:
2019-08-27
Event end date:
2019-08-29
DOI:
EISSN:
1611-3349
ISSN:
0302-9743
EISBN:
9783030269807
ISBN:
9783030269791


Language:
English
Keywords:
Pubs id:
1081708
Local pid:
pubs:1081708
Deposit date:
2020-01-30
ARK identifier:

Terms of use


Views and Downloads






If you are the owner of this record, you can report an update to it here: Report update to this record

TO TOP