Guaranteed and computable error bounds for approximations constructed by an iterative decoupling of the Biot problem
Kumar, K., Kyas, S., Nordbotten, J. M., & Repin, S. (2021). Guaranteed and computable error bounds for approximations constructed by an iterative decoupling of the Biot problem. Computers and Mathematics with Applications , 91, 122-149. https://doi.org/10.1016/j.camwa.2020.05.005
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Computers and Mathematics with ApplicationsDate
2021Copyright
© 2020 The Authors. Published by Elsevier Ltd.
The paper is concerned with guaranteed a posteriori error estimates for a class of evolutionary problems related to poroelastic media governed by the quasi-static linear Biot equations. The system is decoupled by employing the fixed-stress split scheme, which leads to an iteratively solved semi-discrete system. The error bounds are derived by combining a posteriori estimates for contractive mappings with functional type error control for elliptic partial differential equations. The estimates are applicable to any approximation in the admissible functional space and are independent of the discretization method. They are fully computable, do not contain mesh-dependent constants, and provide reliable global estimates of the error measured in the energy norm. Moreover, they suggest efficient error indicators for the distribution of local errors and can be used in adaptive procedures.
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The work is funded by the SIU Grant CPRU-2015/10040. The second author wants to acknowledge the Werner Siemens Foundation (Werner Siemens-Stiftung) for its support of the Geothermal Energy and Geofluids group at ETH Zurich, Switzerland. KK and JMN would like to acknowledge Norwegian Research Council project Toppforsk 250223 for funding.License
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