Minecraft 1.5.2 | Sui Dhaaga | 2018 Watch Full Hindi Online - 1-3 Pre Dvd Rip | After the Dark Duration: 1h 47min

[share_ebook] Hypersingular integral equations and their applications


Author: I.K.Lifanov, L.N.Poltavskii, G.M.Vainikko

Date: 2004

ISBN: 0415309980

Pages: 406

Language: English

Publisher: Chapman & Hall/CRC

Category: Study

Tag: Mathematics


Posted on 2010-12-31, by mmortal.

Description

Hypersingular integral equations, i.e., integral equations whose kernel has a singularity of an  order greater than one, are a convenient tool for studying spatial problems in air and fluid dynamics,  elasticity, the theory of diffraction of electromagnetic and acoustic waves, ecology, etc. Usually,  hypersingular integral equations are obtained as a result of reducing Neumann boundary value  problems for the Laplace or the Helmholtz equation to integral equations by means of the double-  layer potential.  In this book, exact analytical solutions of some two-dimensional hypersingular integral equa-  equations are constructed for the first time. An analytical solution in quadratures is obtained for the  hypersingular equation on the sphere to which the Neumann problem for the Laplace equation on  the sphere is reduced.  The book also contains an original exposition of some topics in the theory of the double-layer  and single-layer potentials.

Sponsored High Speed Downloads
8262 dl's @ 2600 KB/s
Download Now [Full Version]
5723 dl's @ 2815 KB/s
Download Link 1 - Fast Download
9355 dl's @ 2982 KB/s
Download Mirror - Direct Download



Search More...
[share_ebook] Hypersingular integral equations and their applications

Search free ebooks in ebookee.com!


Links
Download this book

Download links for "[share_ebook] Hypersingular integral equations and their applications":

External Download Link1:

External Download Link2:


Related Books

  1. Ebooks list page : 9388
  2. 2018-01-28[PDF] Hypersingular Integral Equations and Their Applications (Differential and Integral Equations and Their Applications)
  3. 2010-04-11Hypersingular Integral Equations and Their Applications (Differential and Integral Equations and Their Applications, 4)
  4. 2009-05-23Hypersingular Integral Equations and Their Applications
  5. 2011-10-02Elliptic Theory on Singular Manifolds (Differential and Integral Equations and Their Applications)
  6. 2011-06-12High-Precision Methods in Eigenvalue Problems and Their Applications (Differential and Integral Equations and Their Applications)
  7. 2018-01-28[PDF] High-Precision Methods in Eigenvalue Problems and Their Applications (Differential and Integral Equations and Their Applications)
  8. 2017-12-31[PDF] Applications of Lie Groups to Difference Equations (Differential and Integral Equations and Their Applications)
  9. 2017-12-30[PDF] Integral Equations and their Applications
  10. 2017-11-07[PDF] Elliptic Theory on Singular Manifolds (Differential and Integral Equations and Their Applications)
  11. 2014-05-01Integral Equations and Their Applications (repost)
  12. 2013-02-27Integral Equations and Their Applications (Repost)
  13. 2012-09-30Integral Equations and their Applications
  14. 2012-09-04Integral Equations and their Applications
  15. 2011-10-06Integral Equations and Their Applications
  16. 2011-10-04Integral Equations and Their Applications
  17. 2011-06-14High-Precision Methods in Eigenvalue Problems and Their Applications (Differential and Integral Equations and Their Applications)
  18. 2011-03-18Integral Equations and Their Applications By Matiur Rahman
  19. 2011-02-13Integral Equations and Their Applications
  20. 2011-02-11Integral Equations and Their Applications

Comments

No comments for "[share_ebook] Hypersingular integral equations and their applications".


    Add Your Comments
    1. Download links and password may be in the description section, read description carefully!
    2. Do a search to find mirrors if no download links or dead links.

    required

    required, will not be published

    need login

    required

    Not clear? Click here to refresh.

    Back to Top