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Superconvergent discontinuous Galerkin methods for nonlinear parabolic initial and boundary value problems

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dc.contributor.author Yadav, Sangita
dc.date.accessioned 2023-08-16T04:13:56Z
dc.date.available 2023-08-16T04:13:56Z
dc.date.issued 2019-09
dc.identifier.uri https://www.degruyter.com/document/doi/10.1515/jnma-2018-0035/html?lang=en
dc.identifier.uri http://dspace.bits-pilani.ac.in:8080/xmlui/handle/123456789/11402
dc.description.abstract In this article, we discuss error estimates for nonlinear parabolic problems using discontinuous Galerkin methods which include HDG method in the spatial direction while keeping time variable continuous. When piecewise polynomials of degree k ⩾ 1 are used to approximate both the potential as well as the flux, it is shown that the error estimate for the semi-discrete flux in L∞(0, T; L2)-norm is of order k + 1. With the help of a suitable post-processing of the semi-discrete potential, it is proved that the resulting post-processed potential converges with order of convergence O(√log(T/h2)hk+2) in L∞(0, T; L2)-norm. These results extend the HDG analysis of Chabaud and Cockburn [Math. Comp. 81 (2012), 107–129] for the heat equation to non-linear parabolic problems. en_US
dc.language.iso en en_US
dc.publisher De Gruyter en_US
dc.subject Mathematics en_US
dc.subject DGM en_US
dc.subject Nonlinear parabolic problems en_US
dc.subject Numerical experiments en_US
dc.title Superconvergent discontinuous Galerkin methods for nonlinear parabolic initial and boundary value problems en_US
dc.type Article en_US


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