English

Adaptive algorithms in sampling recovery

Functional Analysis 2011-03-01 v2

Abstract

We study optimal algorithms in adaptive sampling recovery of smooth functions defined on the unit dd-cube \IId:=[0,1]d{\II}^d:= [0,1]^d. The recovery error is measured in the quasi-norm q\|\cdot\|_q of Lq:=Lq(\IId)L_q := L_q(\II^d). For BB a subset in Lq,L_q, we define a sampling algorithm of recovery with the free choice of sample points and recovering functions from BB as follows. For each ff from the quasi-normed Besov space Bp,θαB^\alpha_{p,\theta}, we choose nn sample points. This choice defines nn sampled values. Based on these sample points and sampled values, we choose a function from BB for recovering ff. The choice of nn sample points and a recovering function from BB for each fBp,θαf \in B^\alpha_{p,\theta} defines a nn-sampling algorithm SnBS_n^B by functions in BB. If Φ={ϕk}kK\Phi = \{\phi_k\}_{k \in K} is a family of elements in LqL_q, let Σn(Φ)\Sigma_n(\Phi) be the non-linear set of linear combinations of nn free terms from Φ,\Phi, that is Σn(Φ):={ϕ=j=1najϕkj: kjK}\Sigma_n(\Phi):= \{\, \phi = \sum_{j=1}^n a_j \phi_{k_j}: \ k_j \in K \, \}. Denote by G{\mathcal G} the set of all families Φ\Phi in LqL_q such that the intersection of Φ\Phi with any finite dimensional subspace in LqL_q is a finite set, and by \Cc(Bp,θα,Lq)\Cc(B^\alpha_{p,\theta}, L_q) the set of all continuous mappings from Bp,θαB^\alpha_{p,\theta} into LqL_q. We define the quantity νn(Bp,θα,Lq):=infΦGinfSnB\Cc(X,Lq):B=Σn(Φ)supfBp,θα1 fSnB(f)q.\nu_n(B^\alpha_{p,\theta},L_q) := \inf_{\Phi \in {\mathcal G}} \inf_{S_n^B \in \Cc(X, L_q): B= \Sigma_n(\Phi)} \sup_{\|f\|_{B^\alpha_{p,\theta}} \le 1} \ \|f - S_n^B(f)\|_q. Let 0<p,q,θ0 < p,q, \theta \le \infty and α>d/p\alpha > d/p. Then we prove the asymptotic order νn(Bp,θα,Lq)nα/d. \nu_n(B^\alpha_{p,\theta},L_q) \asymp n^{- \alpha / d}. We also obtained the asymptotic order of quantities of optimal recovery by SnBS_n^B in terms of best nn-term approximation as well of other non-linear nn-widths.

Keywords

Cite

@article{arxiv.1102.3540,
  title  = {Adaptive algorithms in sampling recovery},
  author = {Dinh Dũng},
  journal= {arXiv preprint arXiv:1102.3540},
  year   = {2011}
}
R2 v1 2026-06-21T17:27:47.465Z