dc.contributor.author |
Fedotov, I
|
|
dc.contributor.author |
Fedotova, T
|
|
dc.contributor.author |
Shatalov, M
|
|
dc.contributor.author |
Tenkam, HM
|
|
dc.date.accessioned |
2010-01-22T13:12:51Z |
|
dc.date.available |
2010-01-22T13:12:51Z |
|
dc.date.issued |
2009-07 |
|
dc.identifier.citation |
Fedotov, I, Fedotova, T et al. 2009. Application of eigenfunction orthogonalities to vibration problems. World Congress on Engineering 2009, London, U.K., 1-3 July 2009, pp 5 |
en |
dc.identifier.isbn |
978-988-18210-1-0 |
|
dc.identifier.uri |
http://hdl.handle.net/10204/3915
|
|
dc.description |
World Congress on Engineering 2009, London, U.K., 1-3 July 2009 |
en |
dc.description.abstract |
The modelling of vibration problems is of great importance in engineering. A popular method of analysing such problems is the variational method. The simplest vibration model is represented using the example of a long rod. Two kinds of eigenfunctions orthogonality are proved and the corresponding norms are used to derive Green's function that gives rise to an analytical solution of the problem. The method can be easily generalized to a broad class of hyperbolic problems. |
en |
dc.language.iso |
en |
en |
dc.subject |
Green's function |
en |
dc.subject |
Bishop theory |
en |
dc.subject |
Orthogonality |
en |
dc.subject |
Wave equation |
en |
dc.subject |
Vibration |
en |
dc.subject |
Eigenfunction orthogonalities |
en |
dc.title |
Application of eigenfunction orthogonalities to vibration problems |
en |
dc.type |
Conference Presentation |
en |
dc.identifier.apacitation |
Fedotov, I., Fedotova, T., Shatalov, M., & Tenkam, H. (2009). Application of eigenfunction orthogonalities to vibration problems. http://hdl.handle.net/10204/3915 |
en_ZA |
dc.identifier.chicagocitation |
Fedotov, I, T Fedotova, M Shatalov, and HM Tenkam. "Application of eigenfunction orthogonalities to vibration problems." (2009): http://hdl.handle.net/10204/3915 |
en_ZA |
dc.identifier.vancouvercitation |
Fedotov I, Fedotova T, Shatalov M, Tenkam H, Application of eigenfunction orthogonalities to vibration problems; 2009. http://hdl.handle.net/10204/3915 . |
en_ZA |
dc.identifier.ris |
TY - Conference Presentation
AU - Fedotov, I
AU - Fedotova, T
AU - Shatalov, M
AU - Tenkam, HM
AB - The modelling of vibration problems is of great importance in engineering. A popular method of analysing such problems is the variational method. The simplest vibration model is represented using the example of a long rod. Two kinds of eigenfunctions orthogonality are proved and the corresponding norms are used to derive Green's function that gives rise to an analytical solution of the problem. The method can be easily generalized to a broad class of hyperbolic problems.
DA - 2009-07
DB - ResearchSpace
DP - CSIR
KW - Green's function
KW - Bishop theory
KW - Orthogonality
KW - Wave equation
KW - Vibration
KW - Eigenfunction orthogonalities
LK - https://researchspace.csir.co.za
PY - 2009
SM - 978-988-18210-1-0
T1 - Application of eigenfunction orthogonalities to vibration problems
TI - Application of eigenfunction orthogonalities to vibration problems
UR - http://hdl.handle.net/10204/3915
ER -
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en_ZA |