A cubic B-spline semi-analytical algorithm for simulation of 3D steady-state convection-diffusion-reaction problems

Abstract In this work, a new cubic B-spline-based semi-analytical algorithm is presented for solving 3D anisotropic convection-diffusion-reaction (CDR) problems in the inhomogeneous medium. The mathematical model is expressed by the quasi-linear second-order elliptic partial differential equations (EPDE) with mixed derivatives and variable coefficients. The final approximation is obtained as a sum of the rough primary solution and the modified spline interpolants with free parameters. The primary solution mathematically satisfies boundary conditions. Thus, the free parameters of interpolants are chosen to satisfy the governing equation in the solution domain. The numerical examples demonstrate the high accuracy of the proposed method in solving 3D CDR problems in single- and multi-connected domains.

[1]  Carl de Boor,et al.  A Practical Guide to Splines , 1978, Applied Mathematical Sciences.

[2]  John W. Stephenson,et al.  Fourth‐order finite difference methods for three‐dimensional general linear elliptic problems with variable coefficients , 1987 .

[3]  Alper Korkmaz,et al.  Quartic and quintic B-spline methods for advection-diffusion equation , 2016, Appl. Math. Comput..

[4]  R. K. Mohanty,et al.  A new highly accurate discretization for three‐dimensional singularly perturbed nonlinear elliptic partial differential equations , 2006 .

[5]  Yang Jiao,et al.  Theoretical framework for percolation threshold, tortuosity and transport properties of porous materials containing 3D non-spherical pores , 2019, International Journal of Engineering Science.

[6]  R. C. Mittal,et al.  Numerical solutions of two-dimensional unsteady convection–diffusion problems using modified bi-cubic B-spline finite elements , 2017, Int. J. Comput. Math..

[7]  Murli M. Gupta,et al.  Symbolic derivation of finite difference approximations for the three‐dimensional Poisson equation , 1998 .

[8]  Jun Zhang,et al.  An explicit fourth‐order compact finite difference scheme for three‐dimensional convection–diffusion equation , 1998 .

[9]  Laizhong Song,et al.  A fast and stabilized meshless method for the convection-dominated convection-diffusion problems , 2016 .

[10]  Hradyesh Kumar Mishra,et al.  Quintic B-Spline Method for Singularly Perturbed Fourth-Order Ordinary Differential Equations of Reaction–Diffusion Type , 2018, National Academy Science Letters.

[11]  Stephen J. Foster,et al.  Application of the meshless generalised RKPM to the transient advection-diffusion-reaction equation , 2017 .

[12]  Angelo Iollo,et al.  A finite-difference method for the variable coefficient Poisson equation on hierarchical Cartesian meshes , 2018, J. Comput. Phys..

[13]  R. Bellman,et al.  Quasilinearization and nonlinear boundary-value problems , 1966 .

[14]  Shangyou Zhang,et al.  A Weak Galerkin Finite Element Method for Singularly Perturbed Convection-Diffusion-Reaction Problems , 2018, SIAM J. Numer. Anal..

[15]  Junpu Li,et al.  A Dual-Level Method of Fundamental Solutions in Conjunction with Kernel-Independent Fast Multipole Method for Large-Scale Isotropic Heat Conduction Problems , 2019, Advances in Applied Mathematics and Mechanics.

[16]  Mehdi Dehghan,et al.  A simple form for the fourth order difference method for 3-D elliptic equations , 2007, Appl. Math. Comput..

[17]  Ji Lin,et al.  Simulation of Seismic Wave Scattering by Embedded Cavities in an Elastic Half-Plane Using the Novel Singular Boundary Method , 2018, Advances in Applied Mathematics and Mechanics.

[18]  Jalil Rashidinia,et al.  Numerical solution of hyperbolic telegraph equation by cubic B-spline collocation method , 2016, Appl. Math. Comput..

[19]  Yinnian He,et al.  RBF-based meshless local Petrov Galerkin method for the multi-dimensional convection–diffusion-reaction equation , 2019, Engineering Analysis with Boundary Elements.

[20]  S. Kumar,et al.  Numerical method for advection diffusion equation using FEM and B-splines , 2012, J. Comput. Sci..

[21]  Wen Chen,et al.  A boundary-type meshless solver for transient heat conduction analysis of slender functionally graded materials with exponential variations , 2018, Comput. Math. Appl..

[22]  G. Fairweather,et al.  Orthogonal spline collocation methods for partial di erential equations , 2001 .

[23]  R. K. Mohanty,et al.  A new high order compact off-step discretization for the system of 3D quasi-linear elliptic partial differential equations , 2013 .

[24]  Y. Çengel Heat and Mass Transfer: Fundamentals and Applications , 2000 .

[25]  R. K. Mohanty,et al.  Technical note: The numerical solution of the system of 3‐D nonlinear elliptic equations with mixed derivatives and variable coefficients using fourth‐order difference methods , 1995 .

[26]  Qingsong Hua,et al.  Boundary function method for inverse geometry problem in two-dimensional anisotropic heat conduction equation , 2018, Appl. Math. Lett..

[27]  Yi Xu,et al.  Simulation of linear and nonlinear advection-diffusion-reaction problems by a novel localized scheme , 2020, Appl. Math. Lett..

[28]  Gabriel R. Barrenechea,et al.  A stabilised finite element method for the convection–diffusion–reaction equation in mixed form , 2018, Computer Methods in Applied Mechanics and Engineering.

[29]  Volker John,et al.  On Finite Element Methods for 3D Time-Dependent Convection-Diffusion-Reaction Equations with Small Diffusion , 2008 .

[30]  Thirupathi Gudi,et al.  Patch‐wise local projection stabilized finite element methods for convection–diffusion–reaction problems , 2018, Numerical Methods for Partial Differential Equations.

[31]  Jun Lu,et al.  A novel meshless method for fully nonlinear advection-diffusion-reaction problems to model transfer in anisotropic media , 2018, Appl. Math. Comput..

[32]  Wen Chen,et al.  Analysis of three-dimensional anisotropic heat conduction problems on thin domains using an advanced boundary element method , 2017, Comput. Math. Appl..

[33]  L. Tobiska,et al.  Local projection stabilization for convection–diffusion–reaction equations on surfaces , 2019, Computer Methods in Applied Mechanics and Engineering.

[34]  Murli M. Gupta,et al.  High accuracy multigrid solution of the 3D convection-diffusion equation , 2000, Appl. Math. Comput..

[35]  Jun Lu,et al.  Fast simulation of multi-dimensional wave problems by the sparse scheme of the method of fundamental solutions , 2016, Comput. Math. Appl..

[36]  Ji Lin,et al.  An accurate meshless formulation for the simulation of linear and fully nonlinear advection diffusion reaction problems , 2018, Adv. Eng. Softw..

[37]  Jun Zhang Fast and High Accuracy Multigrid Solution of the Three Dimensional Poisson Equation , 1998 .

[38]  Jie Wang,et al.  A general meshsize fourth-order compact difference discretization scheme for 3D Poisson equation , 2006, Appl. Math. Comput..

[39]  S. Reutskiy,et al.  A meshless radial basis function method for 2D steady-state heat conduction problems in anisotropic and inhomogeneous media , 2016 .

[40]  Sheo Kumar,et al.  Galerkin-least square B-spline approach toward advection-diffusion equation , 2015, Appl. Math. Comput..

[41]  R. K. Mohanty,et al.  High accuracy cubic spline approximation for two dimensional quasi-linear elliptic boundary value problems , 2013 .

[42]  Ramesh Chand Mittal,et al.  Redefined cubic B-splines collocation method for solving convection–diffusion equations , 2012 .

[43]  M. Ghasemi,et al.  High order approximations using spline-based differential quadrature method: Implementation to the multi-dimensional PDEs , 2017 .

[44]  Siraj-ul-Islam,et al.  Haar wavelet collocation method for three-dimensional elliptic partial differential equations , 2017, Comput. Math. Appl..

[45]  S. Reutskiy,et al.  A semi‐analytic collocation technique for steady‐state strongly nonlinear advection‐diffusion‐reaction equations with variable coefficients , 2017 .

[46]  Aiguo Xiao,et al.  Implicit–explicit multistep finite-element methods for nonlinear convection-diffusion-reaction equations with time delay , 2018, Int. J. Comput. Math..