Abstract
Some theorems of compactly supported non-tensor product form two-dimension Daubechies wavelet were analysed carefully. Compactly supported non-tensor product form two-dimension wavelet was constructed, then non-tensor product form two dimension wavelet finite element was used to solve the deflection problem of elastic thin plate. The error order was researched. A numerical example was given at last.
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Jin, Jm., Xue, Px., Xu, Yx. et al. Compactly supported non-tensor product form two-dimension wavelet finite element. Appl Math Mech 27, 1673–1686 (2006). https://doi.org/10.1007/s10483-006-1210-z
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DOI: https://doi.org/10.1007/s10483-006-1210-z
Key words
- compactly supported
- non-tensor product
- two-dimension wavelet
- interpolation function
- elastic thin plate
- deflection
- finite element