Sahoo, Trilochan.,
Mathematical techniques for wave interaction with flexible structures / Trilochan Sahoo. - 1 online resource (xvi, 226 pages) - IIT Kharagpur research monograph series . - IIT Kharagpur research monograph series. .
1. General introduction -- 2. Fourier analysis -- 3. Green's function technique -- 4. Wave interaction with vertical flexible porous structures -- 5. Time domain analysis of wave structure interaction problems -- 6. Shallow water approximation -- 7. Boundary integral equation method.
This book presents a contemporary account of research on various mathematical/numerical techniques to deal with the interaction of surface gravity waves with flexible floating/submerged structures which are available in the scientific literature in a scattered manner. It emphasizes unique determination of the solution for a class of physical problems associated with Laplace or Helmholtz type equations, applications of the theory of ordinary and partial differential equations, Fourier Analyses etc. It provides a toolkit to a large section of the scientific community including mathematicians, physicists and engineers working on fluid structure interactions--
9780429086595
10.1201/b12979 doi
Flexible structures--Mathematical models.
Fluid-structure interaction--Mathematical models.
TA357.5.F58 / S26 2013
624.171 / S131
Mathematical techniques for wave interaction with flexible structures / Trilochan Sahoo. - 1 online resource (xvi, 226 pages) - IIT Kharagpur research monograph series . - IIT Kharagpur research monograph series. .
1. General introduction -- 2. Fourier analysis -- 3. Green's function technique -- 4. Wave interaction with vertical flexible porous structures -- 5. Time domain analysis of wave structure interaction problems -- 6. Shallow water approximation -- 7. Boundary integral equation method.
This book presents a contemporary account of research on various mathematical/numerical techniques to deal with the interaction of surface gravity waves with flexible floating/submerged structures which are available in the scientific literature in a scattered manner. It emphasizes unique determination of the solution for a class of physical problems associated with Laplace or Helmholtz type equations, applications of the theory of ordinary and partial differential equations, Fourier Analyses etc. It provides a toolkit to a large section of the scientific community including mathematicians, physicists and engineers working on fluid structure interactions--
9780429086595
10.1201/b12979 doi
Flexible structures--Mathematical models.
Fluid-structure interaction--Mathematical models.
TA357.5.F58 / S26 2013
624.171 / S131