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Numerical Analysis pp 50–63Cite as

Chebyshev methods for integral and differential equations

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Part of the book series: Lecture Notes in Mathematics ((LNM,volume 912))

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References

  1. L. M. Delves, “A Fast Method for the solution of Fredholm Integral Equations” J. Inst. Math. Applics. 20 (1977) 173–182.

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  2. L. M. Delves, L. F. Abd-Elal & J. A. Hendry “A Fast Galerkin Algorithm for Singular Integral Equations” J. Inst. Math. Applics. 23 (1979) 139–166.

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  3. R. E. Scraton, “A Chebyshev method for the solution of Fredholm Integral Equations” Math. Comput. 23, (1969) 837–845.

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  4. L. M. Delves, L. F. Abd-Elal & J. A. Hendry “A set of Modules for the solution of Integral Equations” Comput. Jnl. 24 (1981) 184–190.

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  5. C. T. H. Baker, “The Numerical Treatment of Integral Equations” Oxford University Press 1978.

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  6. E. Babolian & L. M. Delves, ‘An Augmented Galerkin Method for First Kind Fredholm Equations” J. Inst. Math. Applics. 24 (1979) 151–174.

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  7. L. M. Delves & C. A. Hall, “An Implicit Matching Principle for Global Element Calculations” J. Inst. Math. Applics. 23 (1979) 223–234.

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  8. L. M. Delves & C. Phillips, “A Fast Implementation of the Global Element Method” J. Inst. Math. Applics. 25 (1980) 177–197.

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  9. E. Babolian & L. M. Delves, ‘A Fast Galerkin scheme for Linear Integro-differential Equations” IMA Journal of Numer. Anal. 1 (1981) 193–213.

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  10. E. N. Hasting & J. R. Rice “A Population of Elliptic Partial Differential Equations in two Variables” Preprint, Purdue University, 1978.

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  11. L. M. Delves, J. A. Hendry & J. Mohamed, “Iterative solution of the Global Element Equations” submitted to J. Comp. Phys.

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Authors
  1. L. M. Delves
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G. Alistair Watson

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© 1982 Springer-Verlag

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Delves, L.M. (1982). Chebyshev methods for integral and differential equations. In: Watson, G.A. (eds) Numerical Analysis. Lecture Notes in Mathematics, vol 912. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0093148

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  • DOI: https://doi.org/10.1007/BFb0093148

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  • Publisher Name: Springer, Berlin, Heidelberg

  • Print ISBN: 978-3-540-11199-3

  • Online ISBN: 978-3-540-39009-1

  • eBook Packages: Springer Book Archive

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