ℋ-inverses for RBF interpolation

09/13/2021

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We consider the interpolation problem for a class of radial basis functions (RBFs) that includes the classical polyharmonic splines (PHS). We show that the inverse of the system matrix for this interpolation problem can be approximated at an exponential rate in the block rank in the ℋ-matrix format if the block structure of the ℋ-matrix arises from a standard clustering algorithm.

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ℋ-inverses for RBF interpolation

ℋ-matrix approximability of inverses of FEM matrices for the time-harmonic Maxwell equations

Approximating inverse FEM matrices on non-uniform meshes with H-matrice

Approximating inverse FEM matrices on non-uniform meshes with H-matrices

Block Discrete Empirical Interpolation Methods

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Computational issues by interpolating with inverse multiquadrics: a solution

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ℋ-inverses for RBF interpolation

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ℋ-matrix approximability of inverses of FEM matrices for the time-harmonic Maxwell equations

Approximating inverse FEM matrices on non-uniform meshes with H-matrice

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Block Discrete Empirical Interpolation Methods

Selective Inference for Latent Block Models

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