Solution of Burgers' Equation Using the Marker Method

Journal Home
Volume 21 - 2024
- Vol. 21, Issue 6 pp.793-932
- Vol. 21, Issue 5 pp.609-792
- Vol. 21, Issue 4 pp.459-608
- Vol. 21, Issue 3 pp.315-458
- 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 3, Issue 1

Jerome L. V. Lewandowski

Int. J. Numer. Anal. Mod., 3 (2006), pp. 80-93.

Published online: 2006-03

Preview Full PDF 2850 22386

Cited by

google scholar semantic scholar

Export citation

Abstract

A new method for the solution of Burgers' equation is described. The marker method relies on the definition of a convective field associated with the underlying partial differential equation; the information about the approximate solution is associated with the response of an ensemble of markers to this convective field. Some key aspects of the method, such as the selection of the shape function and the initial loading, are discussed in some details. The marker method is applicable to a general class of nonlinear dispersive partial differential equations.

Keywords

particle method, Burger equation, marker method, shape function.

AMS Subject Headings

35R35, 49J40, 60G40

Email address

BibTex
RIS
TXT

@Article{IJNAM-3-80, author = {Lewandowski , Jerome L. V.}, title = {Solution of Burgers' Equation Using the Marker Method}, journal = {International Journal of Numerical Analysis and Modeling}, year = {2006}, volume = {3}, number = {1}, pages = {80--93}, abstract = {

}, issn = {2617-8710}, doi = {https://doi.org/}, url = {http://global-sci.org/intro/article_detail/ijnam/890.html} }

TY - JOUR T1 - Solution of Burgers' Equation Using the Marker Method AU - Lewandowski , Jerome L. V. JO - International Journal of Numerical Analysis and Modeling VL - 1 SP - 80 EP - 93 PY - 2006 DA - 2006/03 SN - 3 DO - http://doi.org/ UR - https://global-sci.org/intro/article_detail/ijnam/890.html KW - particle method, Burger equation, marker method, shape function. AB -

Lewandowski , Jerome L. V.. (2006). Solution of Burgers' Equation Using the Marker Method. International Journal of Numerical Analysis and Modeling. 3 (1). 80-93. doi:

Copy to clipboard

BibteX RIS TXT

The citation has been copied to your clipboard

- LOGIN -

- E-mail verification -

- REGISTER -