R. K. Mohanty An unconditionally stable difference scheme for the one-space-dimensional linear hyperbolic equation. [Citation Graph (0, 0)][DBLP] Appl. Math. Lett., 2004, v:17, n:1, pp:101-105 [Journal]
David J. Evans, R. K. Mohanty Alternating Group Explicit Method for the Numerical Solution of Non-Linear Singular Two-Point Boundary Value Problems Using a Fourth Order Finite Difference Method. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2002, v:79, n:10, pp:1121-1133 [Journal]
R. K. Mohanty, David J. Evans A Fourth Order Accurate Cubic Spline Alternating Group Explicit Method for Non-Linear Singular Two Point Boundary Value Problems. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2003, v:80, n:4, pp:479-492 [Journal]
R. K. Mohanty, David J. Evans The numerical solution of fourth order mildly quasi-linear parabolic initial boundary value problem of second kind. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2003, v:80, n:9, pp:1147-1159 [Journal]
R. K. Mohanty, David J. Evans, Dinesh Kumar High Accuracy Difference Formulae for a Fourth Order Quasi-Linear Parabolic Initial Boundary Value Problem of First Kind. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2003, v:80, n:3, pp:381-398 [Journal]
R. K. Mohanty, Navnit Jha, David J. Evans Spline in compression method for the numerical solution of singularly perturbed two-point singular boundary-value problems. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2004, v:81, n:5, pp:615-627 [Journal]
David J. Evans, R. K. Mohanty On the application of the SMAGE parallel algorithms on a non-uniform mesh for the solution of non-linear two-point boundary value problems with singularity. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2005, v:82, n:3, pp:341-353 [Journal]
R. K. Mohanty, David J. Evans Fourth-order accurate BLAGE iterative method for the solution of two-dimensional elliptic equations in polar co-ordinates. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2004, v:81, n:12, pp:1537-1548 [Journal]
R. K. Mohanty, David J. Evans Highly accurate two parameter CAGE parallel algorithms for non-linear singular two point boundary value problems. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2005, v:82, n:4, pp:433-444 [Journal]
R. K. Mohanty, David J. Evans Alternating group explicit parallel algorithms for the solution of one-space dimensional non-linear singular parabolic equations using an O(k2 + h4) difference method. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2005, v:82, n:2, pp:203-218 [Journal]
R. K. Mohanty, Noopur Khosla A third-order-accurate variable-mesh TAGE iterative method for the numerical solution of two-point non-linear singular boundary value problems. [Citation Graph (0, 0)][DBLP] Int. J. Comput. Math., 2005, v:82, n:10, pp:1261-1273 [Journal]
R. K. Mohanty, Urvashi Arora A family of non-uniform mesh tension spline methods for singularly perturbed two-point singular boundary value problems with significant first derivatives. [Citation Graph (0, 0)][DBLP] Applied Mathematics and Computation, 2006, v:172, n:1, pp:531-544 [Journal]
R. K. Mohanty, Noopur Khosla Application of TAGE iterative algorithms to an efficient third order arithmetic average variable mesh discretization for two-point non-linear boundary value problems. [Citation Graph (0, 0)][DBLP] Applied Mathematics and Computation, 2006, v:172, n:1, pp:148-162 [Journal]
R. K. Mohanty, Swarn Singh A new fourth order discretization for singularly perturbed two dimensional non-linear elliptic boundary value problems. [Citation Graph (0, 0)][DBLP] Applied Mathematics and Computation, 2006, v:175, n:2, pp:1400-1414 [Journal]
R. K. Mohanty, Urvashi Arora A TAGE iterative method for the solution of non-linear singular two point boundary value problems using a sixth order discretization. [Citation Graph (0, 0)][DBLP] Applied Mathematics and Computation, 2006, v:180, n:2, pp:538-548 [Journal]
R. K. Mohanty A class of non-uniform mesh three point arithmetic average discretization for y"=f(x, y, y') and the estimates of y'. [Citation Graph (0, 0)][DBLP] Applied Mathematics and Computation, 2006, v:183, n:1, pp:477-485 [Journal]
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