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Numerical Evaluation of Arbitrary Singular Domain Integrals Using Third-Degree B-Spline Basis Functions

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  • Jin-Xiu Hu
  • Hai-Feng Peng
  • Xiao-Wei Gao

Abstract

A new approach is presented for the numerical evaluation of arbitrary singular domain integrals. In this method, singular domain integrals are transformed into a boundary integral and a radial integral which contains singularities by using the radial integration method. The analytical elimination of singularities condensed in the radial integral formulas can be accomplished by expressing the nonsingular part of the integration kernels as a series of cubic B-spline basis functions of the distance r and using the intrinsic features of the radial integral. In the proposed method, singularities involved in the domain integrals are explicitly transformed to the boundary integrals, so no singularities exist at internal points. A few numerical examples are provided to verify the correctness and robustness of the presented method.

Suggested Citation

  • Jin-Xiu Hu & Hai-Feng Peng & Xiao-Wei Gao, 2014. "Numerical Evaluation of Arbitrary Singular Domain Integrals Using Third-Degree B-Spline Basis Functions," Mathematical Problems in Engineering, Hindawi, vol. 2014, pages 1-10, November.
    • Handle: RePEc:hin:jnlmpe:284106
    DOI: 10.1155/2014/284106
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