|
IEEE transactions on electronic computers
This paper describes a one-step method based on the Lobatto four-point quadrature formula for the numerical solution of the differential equation diy/ dx,=f(x)y+g(x). The method has been extended to the linear differential equation ...
by Institute of Electrical and Electronics Engineers. Computer Group, Institute of Electrical and Electronics Engineers. Professional Technical Group on Electronic Computers
 view
Buy
|
|
Mathematical reviews
Summary: "In a paper by MK. Jain, RK Jain and U. Anantha Krishnaiah [BIT 19 ( 1979), no. ... 94c:65080 6SLOS Cui, Dou Xing; Huang, Tian Yi (PRC-NAN-A; Nanjing ) A numerical method for differential equations of second order.
by American Mathematical Society, Mathematical Association of America
view
Buy
|
|
The computer journal
Numerical solution of linear differential equations and Volterra's integral equation using Lobatto quadrature formula By MK Jain and KD Sharma* This paper describes a one-step method based on the Lobatto four-point quadrature formula ...
by British Computer Society
view
Buy
|
|
Computer mathematics
20991 NUMERICAL SOLUTION OF LINEAR DIFFERENTIAL EQUATIONS AND VOLTERRA'S INTEGRAL EQUATION USING LOBATTO QUADRATURE FORMULA by MK Jain and KD Sharma ( Dept. of Math. , Indian Inst, of Tech., Hauz Khas, New DeUii-29, India); ...
by Geoffrey Knight
view
Buy
|
|
Hybrid systems, computation and control : 5th International Workshop, HSCC 2002, Stanford, CA, USA, March 25-27, 2002 : proceedings
Springer-Verlag, 1996. [8] MK Jain. Numerical Solution of Differential Equations . Wiley Eastern Ltd., New Delhi, 1979. [9] Z. Manna and A. Pnueli. The Temporal Logic of Reactive and Concurrent Systems. Springer-Verlag, 1992.
by Claire J. Tomlin, Mark Russell Greenstreet
view
Buy
|
|
Proceedings of the second National Conference on Mathematical and Computational Models, NCMCM 2003, December 11-12, 2003
The solution values for h = 2 " have been assumed as exaet values for comparison purposes. For Problems 4 and 5, ... Gautschi, W., "Numerical integration of ordinary differential equations based on trigonometric polynomials". Numer.
by R. Nadarajan
view
Buy
|
|
Journal of mathematical and physical sciences
3. D. Gottlieb and B. Gustafsson, Generalized DuFort-Frankel methods for parabolic initial boundary value problems, SIAM J. Numer. Anal., 13, 1, 129-144 (1976). 4. MK Jain, Numerical Solution of Differential Equations, 2nd Ed. Wiley ...
by Indian Institute of Technology (Madras, India)
view
Buy
|
|
Computer and control abstracts
See Entry 56774 i on 'Efficient solution of the variational equation for piecewise-linear differential equations' by Thomas S. Parker and Leon O. Chua See Entry 56801 Numerical simulation of one-dimensional flow of a real gas through a ...
by Institute of Electrical and Electronics Engineers
view
Buy
|
|
International journal of computer mathematics
[9] MK Jain, Numerical Solution of Differential Equations, 2nd Ed., Wiley Eastern Limited, New Dehli, 1984. [10] AKA Khalifa and JC Eilbeck, Collocation with quadratic and cubic splines, IMA J. Numer. Anal. 2 (1982), 111-121.
view
Buy
|
|
Congressus numerantium
RL Brown (1974), Multi-derivative numerical methods for solution of stiff ordinary differential equations, Dept. of Computer ... MK Jain and VK Srivastava (1970), High order stiffly stable methods for ordinary differential equations, ...
view
Buy
| |
|