Acritical studyof higher order discontinuous finite element methods for solution of euler equations / Yasien Essameldin Saadeldin Abdelaziz Ali Shaaban ; Supervised Maha Amin Hassanein , Mohamed Abdelaziz Elbeltagy , Tamer Hishmat Kassem
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TextLanguage: English Publication details: Cairo : Yasien Essameldin Saadeldin Abdelaziz Ali Shaaban , 2021Description: 59 P. : charts ; 30cmOther title: - نقض طرق العنصر المحدود غير المتصل عالية الرتبة [Added title page title]
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Thesis
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قاعة الرسائل الجامعية - الدور الاول | المكتبة المركزبة الجديدة - جامعة القاهرة | Cai01.13.10.M.Sc.2021.Ya.C (Browse shelf(Opens below)) | Not for loan | 01010110083491000 | ||
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مخـــزن الرســائل الجـــامعية - البدروم | المكتبة المركزبة الجديدة - جامعة القاهرة | Cai01.13.10.M.Sc.2021.Ya.C (Browse shelf(Opens below)) | 83491.CD | Not for loan | 01020110083491000 |
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| Cai01.13.10.M.Sc.2021.Sr.A Analysis of stochastic differential equations with fractional noise / | Cai01.13.10.M.Sc.2021.Sr.A Analysis of stochastic differential equations with fractional noise / | Cai01.13.10.M.Sc.2021.Ya.C Acritical studyof higher order discontinuous finite element methods for solution of euler equations / | Cai01.13.10.M.Sc.2021.Ya.C Acritical studyof higher order discontinuous finite element methods for solution of euler equations / | Cai01.13.10.M.Sc.2022.En.I Image classification in applications with limited data using transfer learning / | Cai01.13.10.M.Sc.2022.Ha.D A Dft study of graphene based electrodes in supercapacitors and their defects / | Cai01.13.10.M.Sc.2022.Ma.I Investigating the factors that affect the performance of multi-task learning / |
Thesis (M.Sc.) - Cairo University - Faculty of Engineering - Department of Mathematics and Physics
This thesis presents a critical study for higher order discontinuous finite element methods. This study includes flux reconstruction approach, which includes discontinuous Galerkin method and spectral difference method.The study is conducted in the light of Von Neumann stability analysis. Hence, two-dimensional solver for quadrilateral grid has been developed. Then, a criticism of the aforementioned method is presented based on Von Neumann analysis.This criticism shows that the utilization of polynomial based approximation does not always yield the well-established order of accuracyin literature. Also, it shows that Euler model is second order accurate as a consequence of modelling error. Hence, the utilization of higher order accurate numerical methods does not make sense in solving the Euler equations. Finally, a new development for finite difference method is proposed.This development enables us to get a second order accurate solution without seeking numerical boundary conditions
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