Title of article
On the convergence of expansions in polyharmonic eigenfunctions Original Research Article
Author/Authors
Ben Adcock، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
37
From page
1638
To page
1674
Abstract
We consider expansions of smooth, nonperiodic functions defined on compact intervals in eigenfunctions of polyharmonic operators equipped with homogeneous Neumann boundary conditions. Having determined asymptotic expressions for both the eigenvalues and eigenfunctions of these operators, we demonstrate how these results can be used in the efficient computation of expansions. Next, we consider the convergence. We establish the key advantage of such expansions over classical Fourier series–namely, both faster and higher-order convergence–and provide a full asymptotic expansion for the error incurred by the truncated expansion. Finally, we derive conditions that completely determine the convergence rate.
Keywords
rate of convergence , Orthogonal expansions , Degree of convergence , Polyharmonic eigenfunctions
Journal title
Journal of Approximation Theory
Serial Year
2011
Journal title
Journal of Approximation Theory
Record number
852941
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