Journal article
Generalised Recombination Interpolation Method (GRIM)
- Abstract:
- In this paper we develop the Generalised Recombination Interpolation Method (GRIM) for finding sparse approximations of functions initially given as linear combinations of some (large) number of simpler functions. GRIM is a hybrid of dynamic growth-based interpolation techniques and thinning-based reduction techniques. We establish that the number of non-zero coefficients in the approximation returned by GRIM is controlled by the concentration of the data. In the case that the functions involved are Lip(γ) for some γ>0 in the sense of Stein, we obtain improved convergence properties for GRIM. In particular, we prove that the level of data concentration required to guarantee that GRIM finds a good sparse approximation is decreasing with respect to the regularity parameter γ>0.
- Publication status:
- Not published
- Peer review status:
- Not peer reviewed
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(Preview, Pre-print, pdf, 1.0MB, Terms of use)
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- Publisher copy:
- 10.48550/arXiv.2205.07495
Authors
- Publisher:
- Cornell University
- Host title:
- arXiv
- Journal:
- arXiv More from this journal
- Publication date:
- 2022-05-16
- DOI:
- Language:
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English
- Keywords:
- Pubs id:
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1321993
- Local pid:
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pubs:1321993
- Deposit date:
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2023-01-13
Terms of use
- Copyright holder:
- Lyons and McLeod
- Copyright date:
- 2022
- Rights statement:
- © The Author(s) 2022.
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