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    • School Mathematics, Statistics and Computer Science
    • Applied Mathematics
    • Masters Degrees (Applied Mathematics)
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    Application of the wavelet transform for sparse matrix systems and PDEs.

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    Date
    2009
    Author
    Karambal, Issa.
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    Abstract
    We consider the application of the wavelet transform for solving sparse matrix systems and partial differential equations. The first part is devoted to the theory and algorithms of wavelets. The second part is concerned with the sparse representation of matrices and well-known operators. The third part is directed to the application of wavelets to partial differential equations, and to sparse linear systems resulting from differential equations. We present several numerical examples and simulations for the above cases.
    URI
    http://hdl.handle.net/10413/439
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    • Masters Degrees (Applied Mathematics) [70]

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