Tse-Sun Chow
- 1 MILNES, II. W., AND POTTIS, R.B. Boundary contraction solution of Laplace's differential equation J. A CM 6 (1959), 226-235 Google Scholar
- 2 MILNES, H. W., AND POTTS, R.B. Numerical solution of partial differential equations by boundary eontraetion. Quart. Appl. Math. 18 (1960), 1-13.Google Scholar
- 3 CHOW, T. S., AND MILNES, H.W. Boundary contraction solution of Laplaee's differential equation, II. J. A CM 7 (1960)~ 37-45. Google Scholar
- 4 BODEWIG, E. Matrix Calculus. Interscienee Publishers, 1959; (a) p. 79; (b) p. 175; (e) p. 67.Google Scholar
- 5 CHOW, T. S., AND MILNES, H.W. l~umerical solution of a class of hyperbolic-parabolic partial differential equations by boundary contraction (to appear).Google Scholar
- 6 BELLMAN, R. Introduction to Matrix Analysis, p. 234. McGraw Hill, 1960. Google Scholar
Index Terms
- Numerical Solution of the Neumann and Mixed Boundary Value Problems by Boundary Contraction
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