A priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations
© 2015 Institute for Scientific Computing and Information. In this paper, both semidiscrete and completely discrete finite volume element methods (FVEMs) are analyzed for approximating solutions of a class of linear hyperbolic integro-differential equations in a two-dimensional convex polygonal doma...
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th-cmuir.6653943832-546612018-09-04T10:19:53Z A priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations Samir Karaa Amiya K. Pani Mathematics © 2015 Institute for Scientific Computing and Information. In this paper, both semidiscrete and completely discrete finite volume element methods (FVEMs) are analyzed for approximating solutions of a class of linear hyperbolic integro-differential equations in a two-dimensional convex polygonal domain. The effect of numerical quadrature is also examined. In the semidiscrete case, optimal error estimates in L<sup>∞</sup>(L<sup>2</sup>) and L<sup>∞</sup>(H<sup>1</sup>) norms are shown to hold with minimal regularity assumptions on the initial data, whereas quasi-optimal estimate is derived in L<sup>∞</sup>(L<sup>∞</sup>) norm under higher regularity on the data. Based on a second order explicit method in time, a completely discrete scheme is examined and optimal error estimates are established with a mild condition on the space and time discretizing parameters. Finally, some numerical experiments are conducted which confirm the theoretical order of convergence. 2018-09-04T10:19:53Z 2018-09-04T10:19:53Z 2015-01-01 Journal 17055105 2-s2.0-84929903856 https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84929903856&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/54661 |
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Mathematics Samir Karaa Amiya K. Pani A priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations |
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© 2015 Institute for Scientific Computing and Information. In this paper, both semidiscrete and completely discrete finite volume element methods (FVEMs) are analyzed for approximating solutions of a class of linear hyperbolic integro-differential equations in a two-dimensional convex polygonal domain. The effect of numerical quadrature is also examined. In the semidiscrete case, optimal error estimates in L<sup>∞</sup>(L<sup>2</sup>) and L<sup>∞</sup>(H<sup>1</sup>) norms are shown to hold with minimal regularity assumptions on the initial data, whereas quasi-optimal estimate is derived in L<sup>∞</sup>(L<sup>∞</sup>) norm under higher regularity on the data. Based on a second order explicit method in time, a completely discrete scheme is examined and optimal error estimates are established with a mild condition on the space and time discretizing parameters. Finally, some numerical experiments are conducted which confirm the theoretical order of convergence. |
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Journal |
| author |
Samir Karaa Amiya K. Pani |
| author_facet |
Samir Karaa Amiya K. Pani |
| author_sort |
Samir Karaa |
| title |
A priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations |
| title_short |
A priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations |
| title_full |
A priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations |
| title_fullStr |
A priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations |
| title_full_unstemmed |
A priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations |
| title_sort |
priori error estimates for finite volume element approximations to second order linear hyperbolic integro-differential equations |
| publishDate |
2018 |
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https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84929903856&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/54661 |
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