The Time High-Order Energy-Preserving Schemes for the Nonlocal Benjamin-Ono Equation

Journal Home
Volume 21 - 2024
- Vol. 21, Issue 2 pp.165-314
- Vol. 21, Issue 1 pp.1-164
Volume 20 - 2023
- Vol. 20, Issue 6 pp.739-895
- Vol. 20, Issue 5 pp.597-738
- Vol. 20, Issue 4 pp.459-595
- Vol. 20, Issue 3 pp.313-458
- Vol. 20, Issue 2 pp.153-312
- Vol. 20, Issue 1 pp.1-151
Volume 19 - 2022
- Vol. 19, Issue 6 pp.739-906
- Vol. 19, Issue 5 pp.603-737
- Vol. 19, Issue 4 pp.439-601
- Vol. 19, Issue 2-3 pp.157-438
- Vol. 19, Issue 1 pp.1-155
Volume 18 - 2021
- Vol. 18, Issue 6 pp.723-880
- Vol. 18, Issue 5 pp.569-721
- Vol. 18, Issue 4 pp.426-568
- Vol. 18, Issue 3 pp.287-425
- Vol. 18, Issue 2 pp.143-286
- Vol. 18, Issue 1 pp.1-141
Volume 17 - 2020
- Vol. 17, Issue 6 pp.767-928
- Vol. 17, Issue 5 pp.613-765
- Vol. 17, Issue 4 pp.457-612
- Vol. 17, Issue 3 pp.297-456
- Vol. 17, Issue 2 pp.151-296
- Vol. 17, Issue 1 pp.1-150
Volume 16 - 2019
- Vol. 16, Issue 6 pp.847-984
- Vol. 16, Issue 5 pp.681-846
- Vol. 16, Issue 4 pp.519-679
- Vol. 16, Issue 3 pp.375-518
- Vol. 16, Issue 2 pp.167-374
- Vol. 16, Issue 1 pp.1-166
Volume 15 - 2018
- Vol. 15, Issue 6 pp.747-918
- Vol. 15, Issue 4-5 pp.479-745
- Vol. 15, Issue 3 pp.307-478
- Vol. 15, Issue 1-2 pp.1-306
Volume 14 - 2017
- Vol. 14, Issue 6 pp.809-962
- Vol. 14, Issue 4-5 pp.477-807
- Vol. 14, Issue 3 pp.313-476
- Vol. 14, Issue 2 pp.153-311
- Vol. 14, Issue 1 pp.1-151
Volume 13 - 2016
- Vol. 13, Issue 6 pp.831-1002
- Vol. 13, Issue 5 pp.657-830
- Vol. 13, Issue 4 pp.493-655
- Vol. 13, Issue 3 pp.319-492
- Vol. 13, Issue 2 pp.179-317
- Vol. 13, Issue 1 pp.1-178
Volume 12 - 2015
- Vol. 12, Issue 4 pp.593-777
- Vol. 12, Issue 3 pp.401-591
- Vol. 12, Issue 2 pp.197-400
- Vol. 12, Issue 1 pp.1-195
Volume 11 - 2014
- Vol. 11, Issue 4 pp.657-865
- Vol. 11, Issue 3 pp.427-656
- Vol. 11, Issue 2 pp.254-426
- Vol. 11, Issue 1 pp.1-253
Volume 10 - 2013
- Vol. 10, Issue 4 pp.757-991
- Vol. 10, Issue 3 pp.509-755
- Vol. 10, Issue 2 pp.257-507
- Vol. 10, Issue 1 pp.1-256
Volume 9 - 2012
- Vol. 9, Issue 4 pp.777-1024
- Vol. 9, Issue 3 pp.479-776
- Vol. 9, Issue 2 pp.169-478
- Vol. 9, Issue 1 pp.1-168
Volume 8 - 2011
- Vol. 8, Issue 4 pp.543-720
- Vol. 8, Issue 3 pp.365-541
- Vol. 8, Issue 2 pp.189-363
- Vol. 8, Issue 1 pp.1-188
Volume 7 - 2010
- Vol. 7, Issue 4 pp.607-805
- Vol. 7, Issue 3 pp.393-606
- Vol. 7, Issue 2 pp.195-391
- Vol. 7, Issue 1 pp.1-193
Volume 6 - 2009
- Vol. 6, Issue 4 pp.533-723
- Vol. 6, Issue 3 pp.355-531
- Vol. 6, Issue 2 pp.177-353
- Vol. 6, Issue 1 pp.1-176
Volume 5 - 2008
- Vol. 5, Issue 5 pp.1-170
- Vol. 5, Issue 4 pp.527-748
- Vol. 5, Issue 3 pp.353-526
- Vol. 5, Issue 2 pp.167-351
- Vol. 5, Issue 1 pp.1-166
Volume 4 - 2007
- Vol. 4, Issue 3-4 pp.307-743
- Vol. 4, Issue 2 pp.143-305
- Vol. 4, Issue 1 pp.1-142
Volume 3 - 2006
- Vol. 3, Issue 4 pp.377-524
- Vol. 3, Issue 3 pp.255-376
- Vol. 3, Issue 2 pp.125-254
- Vol. 3, Issue 1 pp.1-124
Volume 2 - 2005
- Vol. 2, Issue 4 pp.367-488
- Vol. 2, Issue 3 pp.241-366
- Vol. 2, Issue 2 pp.127-239
- Vol. 2, Issue 1 pp.1-126
- Vol. 2, Issue 0 pp.1-208
Volume 1 - 2004
- Vol. 1, Issue 2 pp.111-215
- Vol. 1, Issue 1 pp.1-110

Volume 17, Issue 4

Chunguang Chen, Dong Liang & Shusen Xie

Int. J. Numer. Anal. Mod., 17 (2020), pp. 543-556.

Published online: 2020-08

Preview Purchase PDF 1144 18897

Cited by

google scholar semantic scholar

Export citation

Abstract

The new time high-order energy-preserving schemes are proposed for the nonlocal Benjamin-Ono equation. We get the Hamiltonian system to the nonlocal model, and it is then discretized by a Fourier pseudospectral method in space and the Hamiltonian boundary value method (HBVM) in time. This approach has high order of convergence in time and conserves the total mass and energy in discrete forms. We further develop a time second-order energy-preserving scheme and a time fourth-order energy-preserving scheme for the nonlocal Benjamin-Ono equation. Numerical experiments test the proposed schemes with a single solitary wave and the interaction of two solitary waves. Results confirm the accuracy and conservation properties of the schemes.

Keywords

Nonlocal Benjamin-Ono equation, Hamiltonian boundary value method (HBVM), time high-order, energy preserving, Fourier pseudospectral method.

AMS Subject Headings

Email address

BibTex
RIS
TXT

@Article{IJNAM-17-543, author = {Chen , ChunguangLiang , Dong and Xie , Shusen}, title = {The Time High-Order Energy-Preserving Schemes for the Nonlocal Benjamin-Ono Equation}, journal = {International Journal of Numerical Analysis and Modeling}, year = {2020}, volume = {17}, number = {4}, pages = {543--556}, abstract = {

}, issn = {2617-8710}, doi = {https://doi.org/}, url = {http://global-sci.org/intro/article_detail/ijnam/17869.html} }

TY - JOUR T1 - The Time High-Order Energy-Preserving Schemes for the Nonlocal Benjamin-Ono Equation AU - Chen , Chunguang AU - Liang , Dong AU - Xie , Shusen JO - International Journal of Numerical Analysis and Modeling VL - 4 SP - 543 EP - 556 PY - 2020 DA - 2020/08 SN - 17 DO - http://doi.org/ UR - https://global-sci.org/intro/article_detail/ijnam/17869.html KW - Nonlocal Benjamin-Ono equation, Hamiltonian boundary value method (HBVM), time high-order, energy preserving, Fourier pseudospectral method. AB -

Chunguang Chen, Dong Liang & Shusen Xie. (2020). The Time High-Order Energy-Preserving Schemes for the Nonlocal Benjamin-Ono Equation. International Journal of Numerical Analysis and Modeling. 17 (4). 543-556. doi:

Copy to clipboard

BibteX RIS TXT

The citation has been copied to your clipboard

- LOGIN -

- E-mail verification -

- REGISTER -