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International Journal of Computer Mathematics Volume 60, 1996 - Issue 3-4
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Original Articles

Two parameter age (tage) method for the solution of a tradiagonal linear system of equations

K. S. Sukon Parallel Algorithms Research Centre, Loughborough University of Technology, Loughborough, Leicestershire, Le11 3TU, U.K
&
D. J. Evans Parallel Algorithms Research Centre, Loughborough University of Technology, Loughborough, Leicestershire, Le11 3TU, U.K
Pages 265-278 | Published online: 19 Mar 2007

Citations (17)

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Read on this site (6)

R. K. Mohanty & D. J. Evans. (2005) Highly accurate two parameter CAGE parallel algorithms for non-linear singular two point boundary value problems. International Journal of Computer Mathematics 82:4, pages 433-444.
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R. K. Mohanty & D. J. Evans. (2003) A Fourth Order Accurate Cubic Spline Alternating Group Explicit Method For Non-Linear Singular Two Point Boundary Value Problems*. International Journal of Computer Mathematics 80:4, pages 479-492.
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David J. Evans. (1999) Iterative methods for solving non-linear two point boundary value problems. International Journal of Computer Mathematics 72:3, pages 395-401.
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K. S. Sukon. (1997) The block alternating group explicit method (blage) to solve 2D-elliptic differential equations. International Journal of Computer Mathematics 65:3-4, pages 221-229.
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M. Bhuruth & D.J. Evans. (1997) Block alternating group explicit preconditioning (blage) for a class of fourth order difference schemes. International Journal of Computer Mathematics 63:1-2, pages 121-136.
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K. S. SUKON. (1996) ON TWO PARAMETER ALTERNATING GROUP EXPLICIT (TAGE) METHOD FOR SINGULAR PERTURBATION PROBLEMS. Parallel Algorithms and Applications 10:1-2, pages 71-77.
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Articles from other publishers (11)

Pinaki Ranjan Mohanty. (2020) A new three-point sixth-order THAGE iteration method for mildly nonlinear two-point boundary value problems with engineering applications. Engineering with Computers 38:S1, pages 461-473.
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Pinaki Ranjan Mohanty. (2020) A new sixth-order approximation for nonlinear two-point boundary value problems: application of single-step alternating group explicit iteration method to engineering problems. Engineering with Computers 37:4, pages 3541-3550.
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Jyoti Talwar & R. K. Mohanty. (2014) Coupled Reduced Alternating Group Explicit Algorithm for Third Order Cubic Spline Method on a Non-uniform Mesh for Nonlinear Singular Two Point Boundary Value Problems. Proceedings of the National Academy of Sciences, India Section A: Physical Sciences 85:1, pages 71-81.
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Jyoti Talwar & Ranjan Kumar Mohanty. (2014) A Single Sweep AGE Algorithm based on Off-Step Discretization for the Solution of Viscous Burgers’ Equation on a Variable Mesh. Mathematics in Computer Science 9:1, pages 85-103.
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A. A. Dahalan & J. Sulaiman. (2015) Implementation of TAGE Method Using Seikkala Derivatives Applied to Two-Point Fuzzy Boundary Value Problems. International Journal of Differential Equations 2015, pages 1-7.
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R. K. Mohanty & J. Talwar. (2015) A new coupled reduced alternating group explicit method for nonlinear singular two-point boundary value problems on a variable mesh. Numerical Analysis and Applications 8:1, pages 55-67.
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R. K. Mohanty & Jyoti Talwar. (2014) A Single Sweep AGE Algorithm on a Variable Mesh Based on Off-Step Discretization for the Solution of Nonlinear Burgers’ Equation. Journal of Computational Methods in Physics 2014, pages 1-11.
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R.K. Mohanty & Jyoti Talwar. (2013) SWAGE algorithm for the cubic spline solution of nonlinear viscous Burgers’ equation on a geometric mesh. Results in Physics 3, pages 195-204.
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Ranjan K Mohanty & Jyoti Talwar. (2012) Compact alternating group explicit method for the cubic spline solution of two point boundary value problems with significant nonlinear first derivative terms. Mathematical Sciences 6:1, pages 58.
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Navnit Jha & R.K. Mohanty. (2011) TAGE iterative algorithm and nonpolynomial spline basis for the solution of nonlinear singular second order ordinary differential equations. Applied Mathematics and Computation 218:7, pages 3289-3296.
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R.K. Mohanty, P.L. Sachdev & Navnit Jha. (2004) An O(h4) accurate cubic spline TAGE method for nonlinear singular two point boundary value problems. Applied Mathematics and Computation 158:3, pages 853-868.
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