Tham khảo và ghi chú Trật_tự_của_phép_lấy_tích_phân

  1. Seán Dineen (2001). Multivariate Calculus and Geometry. Springer. tr. 162. ISBN 1-85233-472-X.
  2. Richard Courant & Fritz John (2000). Introduction to Calculus and Analysis: Vol. II/1, II/2. Classics in mathematics. Springer. tr. 897. ISBN 3-540-66569-2.
  3. Department of Mathematics, Oregon State University. “Double Integrals”.
  4. The prime notation "" denotes a derivative.
  5. Edmund Taylor Whittaker & George Neville Watson (1927). A course of modern analysis: an introduction to the general theory of infinite processes and of analytic functions, with an account of the principal transcendental functions (ấn bản 4). Cambridge University Press. tr. §4.51, p. 75. ISBN 0-521-58807-3.
  6. F. D. Gakhov (1990). Boundary Value Problems. Courier Dover Publications. tr. 46. ISBN 0-486-66275-6.
  7. Jian-Ke Lu (1993). Boundary Value Problems for Analytic Functions. Singapore: World Scientific. tr. 44. ISBN 981-02-1020-5.
  8. Daniel Zwillinger (1992). Handbook of integration. AK Peters Ltd. tr. 61. ISBN 0-86720-293-9.
  9. Elena Irodionovna Obolashvili (2003). Higher order partial differential equations in Clifford analysis: effective solutions to problems. Birkhäuser. tr. 101. ISBN 0-8176-4286-2.
  10. 1 2 Ram P. Kanwal (1996). Linear Integral Equations: theory and technique (ấn bản 2). Boston: Birkhäuser. tr. 194. ISBN 0-8176-3940-3.
  11. For a discussion of the Sokhotski-Plemelj formula see, for example, Joseph A. Cima, Alec L. Matheson & William T. Ross (2006). The Cauchy Transform. American Mathematical Society. tr. 56. ISBN 0-8218-3871-7.
  12. Thomas William Körner (1988). Fourier Analysis. Cambridge University Press. tr. Chapters 47 & 48. ISBN 0-521-38991-7.
  13. M. Aslam Chaudhry & Syed M. Zubair (2001). On a Class of Incomplete Gamma Functions with Applications. CRC Press. tr. Appendix C. ISBN 1-58488-143-7.
  14. Murray H. Protter & Charles B. Morrey, Jr. (1985). Intermediate Calculus. Springer. tr. 307. ISBN 0-387-96058-9.

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