| 000 | 01591nam a22001337a 4500 | ||
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| 999 |
_c56155 _d56152 |
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| 100 |
_aKatbar, Nek Muhammad _a13MSM23 _aSupervisor - Prof. Dr . Khuda Bux Amur |
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| 245 | _aFem Based Implicit Numerical Approach For Schoenberg & Glycolysis Models (MS Thesis) | ||
| 260 |
_aNawabshah: _bQUEST, _c2016. |
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| 300 | _a45P, : | ||
| 500 | _aABSTRACT The FIEM (Finite Element Method) based numerical technique for the two- dimensional and two-directional problem is a challenging task for the numerical analysis practitioners. The main goal of this work is the development of an implicit numerical scheme for the solution of a coupled set of nonlinear partial differential equations using FEM. The most common computational strategy for this class of the problems used in the general practice is the FDM (Finite Difference Methods) and generally the rectangular grids are used as the discrete domain of the computation whereas we solve our problem on a triangular grid which allows the local choice of scaling diffusion parameters. The main focus is to apply the developed numerical scheme on the study of the biological models called Schnakenberg and Glycolysis. The Schnakenberg model and Glycolysis model is designed to compute the pattem formation for morphogenesis concentration and glucose concentration in animal species. The main interest is to compute the stripe like and spot like patterns for animal species during morphogenesis concentration and glucose concentration. | ||
| 700 | _aDepartment Of Mathematics | ||
| 856 | _uhttps://tinyurl.com/8fxtk945 | ||
| 942 | _cTHESIS | ||