On Filtered Polynomial Approximation on the Sphere

Abstract: Localised polynomial approximations on the sphere have a variety of applications in areas such as signal processing, geomathematics and cosmology. Filtering is a simple and effective way of constructing a localised polynomial approximation. In this thesis we investigate the localisation properties of filtered polynomial approximations on the sphere. Using filtered polynomial kernels and a special numerical integration (quadrature) rule we construct a fully discrete need let approximation. The localisation of t… Show more

“…We obtain an error bound O N −r /d for the noiseless setting on general manifolds (see Theorem 6). This result generalizes the same bound that was previously obtained on the sphere [35]. Since the bound on the sphere is optimal, the new bound is also optimal.…”

“…From the perspective of information-based complexity it is interesting to observe that if the target function f * is in the Sobolev space W s p (M), s > 0, the convergence rate is optimal in the sense of optimal recovery. This is due to the fact that on a real unit sphere when one uses optimal-order number of points 10) is optimal, as proved by Wang and Sloan [35] and Wang and Wang [36]. Theorem 6 can be viewed as the non-distributed filtered hyperinterpolation for clean data, where the estimator uses the whole data set in one machine.…”

“…The proof of optimal-order error for filtered hyperinterpolation utilizes its decomposition by framelets on manifolds [35,38,43]. Given H ∈ C κ (R + ), κ ≥ 1, we define recursively the contributions of levels j ∈ N 0 for f ∈ L p (M) by…”

“…Then, with (35), (34) and cn d+τ ≤ |D * | ≤ c n 2d , τ ∈ (0, d], M) , where c 5 and c depend only on μ(M), c 1 , d, r , and the filter H and its smoothness κ, and C from Lemma 6.…”

Distributed Learning via Filtered Hyperinterpolation on Manifolds

“…We obtain an error bound O N −r /d for the noiseless setting on general manifolds (see Theorem 6). This result generalizes the same bound that was previously obtained on the sphere [35]. Since the bound on the sphere is optimal, the new bound is also optimal.…”

“…From the perspective of information-based complexity it is interesting to observe that if the target function f * is in the Sobolev space W s p (M), s > 0, the convergence rate is optimal in the sense of optimal recovery. This is due to the fact that on a real unit sphere when one uses optimal-order number of points 10) is optimal, as proved by Wang and Sloan [35] and Wang and Wang [36]. Theorem 6 can be viewed as the non-distributed filtered hyperinterpolation for clean data, where the estimator uses the whole data set in one machine.…”

“…The proof of optimal-order error for filtered hyperinterpolation utilizes its decomposition by framelets on manifolds [35,38,43]. Given H ∈ C κ (R + ), κ ≥ 1, we define recursively the contributions of levels j ∈ N 0 for f ∈ L p (M) by…”

“…Then, with (35), (34) and cn d+τ ≤ |D * | ≤ c n 2d , τ ∈ (0, d], M) , where c 5 and c depend only on μ(M), c 1 , d, r , and the filter H and its smoothness κ, and C from Lemma 6.…”

Distributed Learning via Filtered Hyperinterpolation on Manifolds

“…Wang and Sloan investigated the corresponding problem on the sphere, and gave the compact condition on η for which the operator norms of the filtered polynomial operators V S L,η on the sphere are uniformly bounded. Following the way in [38], Li obtained in [22] that the operator norms V L,η are uniformly bounded whenever η ∈ W ⌊ d+2µ+1…”

Optimal randomized quadrature for weighted Sobolev and Besov classes with the Jacobi weight on the ball

Thin plate spline interpolation