A mathematical model and numerical solution for brain tumor derived using fractional operator
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In this paper, a mathematical model of brain tumor growth and diffusion is presented, which is an extension of a simple two-dimensional mathematical model derived from fractional operator in terms of Caputo which is called the fractional Burgess equations (FBEs).Abstract:
In this paper, we present a mathematical model of brain tumor. This model is an extension of a simple two-dimensional mathematical model of glioma growth and diffusion which is derived from fractional operator in terms of Caputo which is called the fractional Burgess equations (FBEs). To obtain a solution for this model, a numerical technique is presented which is based on operational matrix. First, we assume the solution of the problem under the study is as an expansion of the Bernoulli polynomials. Then with combination of the operational matrix based on the Bernoulli polynomials and collocation method, the problem under the study is changed to a system of nonlinear algebraic equations. Finally, the proposed technique is simulated and tested on three types of the FBEs to confirm the superiority and accuracy.read more
Citations
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Existence and limit problem for fractional fourth order subdiffusion equation and Cahn-Hilliard equation
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Operational matrices based on the shifted fifth-kind Chebyshev polynomials for solving nonlinear variable order integro-differential equations
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