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Algorithm 638: INTCOL and HERMCOL: collocation on rectangular domains with bicubic hermite polynomials
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Source ACM Transactions on Mathematical Software (TOMS) archive
Volume 11 ,  Issue 4  (December 1985) table of contents
Pages: 416 - 418  
Year of Publication: 1985
ISSN:0098-3500
Authors
E. N. Houstis  Purdue Univ. and Univ. of Thessaloniki
W. F. Mitchell  Purdue Univ.
J. R. Rice  Purdue Univ.
Publisher
ACM  New York, NY, USA
Bibliometrics
Downloads (6 Weeks): 2,   Downloads (12 Months): 17,   Citation Count: 3
Additional Information:

appendices and supplements   references   cited by   index terms   collaborative colleagues  

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APPENDICES and SUPPLEMENTS
gZipINTCOL and HERMCOL (638.gz) (24 KB)
collocation with bicubic Hermite polynomials: linear second-order elliptic problems on rectangular two-dimensional domains with general linear boundary conditions or uncoupled boundary conditions
Gams: I2b1a3


REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

1
E. N. Houstis , W. F. Mitchell , J. R. Rice, Collocation software for second-order elliptic partial differential equations, ACM Transactions on Mathematical Software (TOMS), v.11 n.4, p.379-412, Dec. 1985  [doi>10.1145/6187.6191]
 
2
RICE, J. R. ELLPACK: Progress and plans. In Elliptic Problem Solvers. M. Schultz, Ed. Academic Press, New York, 1981, pp. 47-57.
 
3
John R. Rice , Ronald F. Boisvert, Solving elliptic problems using ELLPACK, Springer-Verlag New York, Inc., New York, NY, 1985

CITED BY  3
E. N. Houstis , W. F. Mitchell , J. R. Rice, GENCOL: collocation of general domains with bicubic hermite polynomials (Algorithm 637)., ACM Transactions on Mathematical Software (TOMS), v.11 n.4, p.413-415, Dec. 1985
E. N. Houstis , W. F. Mitchell , J. R. Rice, Collocation software for second-order elliptic partial differential equations, ACM Transactions on Mathematical Software (TOMS), v.11 n.4, p.379-412, Dec. 1985
Ronald F. Boisvert, Mathematical software: past, present, and future, Computational science, mathematics and software, Purdue University Press, West Lafayette, IN, 2002

INDEX TERMS

Classification:
  D. Software
  D.3 PROGRAMMING LANGUAGES
      D.3.2 Language Classifications

          Nouns: FORTRAN

  G. Mathematics of Computing
  G.1 NUMERICAL ANALYSIS
      G.1.8 Partial Differential Equations
          Subjects: Finite element methods; Elliptic equations


General Terms:
Algorithms

Collaborative Colleagues:
E. N. Houstis: colleagues
W. F. Mitchell: colleagues
J. R. Rice: colleagues

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