M. Emamjome scite author profile

In this paper we combine the theory of reproducing kernel Hilbert spaces with the field of collocation methods to solve boundary value problems with special emphasis on reproducing property of kernels. From the reproducing property of kernels we proposed a new efficient algorithm to obtain the cardinal functions of a reproducing kernel Hilbert space which can be apply conveniently for multi-dimensional domains. The differentiation matrices are constructed and also we drive pointwise error estimate of applying them. In addition we prove the non-singularity of collocation matrix. The proposed method is truly meshless and can be applied conveniently and accurately for high order and also multi-dimensional problems. Numerical results are presented for the several problems such as second and fifth order two point boundary value problems, one and two dimensional unsteady Burgers equations and a parabolic partial differential equation in three dimensions. Also we compare the numerical results with those reported in the literature to show the high accuracy and efficiency of the proposed method.

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A reproducing kernel Hilbert space pseudospectral method for numerical investigation of a two-dimensional capillary formation model in tumor angiogenesis problem

Emamjome

Azarnavid

Ghehsareh

2017

Neural Comput & Applic

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M. Emamjome

A numerical method for solving a nonlinear inverse parabolic problem

A numerical solution of an inverse parabolic problem with unknown boundary conditions

A meshless technique based on the pseudospectral radial basis functions method for solving the two-dimensional hyperbolic telegraph equation

A reproducing kernel Hilbert space approach in meshless collocation method

A reproducing kernel Hilbert space pseudospectral method for numerical investigation of a two-dimensional capillary formation model in tumor angiogenesis problem

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