| dc.contributor.author | Har-Peled, S | |
| dc.contributor.author | Indyk, P | |
| dc.contributor.author | Mahabadi, S | |
| dc.date.accessioned | 2021-10-27T20:29:03Z | |
| dc.date.available | 2021-10-27T20:29:03Z | |
| dc.date.issued | 2018-07-01 | |
| dc.identifier.uri | https://hdl.handle.net/1721.1/135736 | |
| dc.description.abstract | © 2018 Schloss Dagstuhl- Leibniz-Zentrum fur Informatik GmbH, Dagstuhl Publishing. All rights reserved. In the Sparse Linear Regression (SLR) problem, given a d × n matrix M and a d-dimensional query q, the goal is to compute a k-sparse n-dimensional vector τ such that the error Mτ − q is minimized. This problem is equivalent to the following geometric problem: given a set P of n points and a query point q in d dimensions, find the closest k-dimensional subspace to q, that is spanned by a subset of k points in P. In this paper, we present data-structures/algorithms and conditional lower bounds for several variants of this problem (such as finding the closest induced k dimensional flat/simplex instead of a subspace). In particular, we present approximation algorithms for the online variants of the above problems with query timeO(nk−1), which are of interest in the "low sparsity regime" where k is small, e.g., 2 or 3. For k = d, this matches, up to polylogarithmic factors, the lower bound that relies on the a nely degenerate conjecture (i.e., deciding if n points in Rd contains d+ 1 points contained in a hyperplane takes (nd) time). Moreover, our algorithms involve formulating and solving several geometric subproblems, which we believe to be of independent interest. | |
| dc.language.iso | en | |
| dc.relation.isversionof | 10.4230/LIPIcs.ICALP.2018.77 | |
| dc.rights | Creative Commons Attribution 4.0 International license | |
| dc.rights.uri | https://creativecommons.org/licenses/by/4.0/ | |
| dc.source | DROPS | |
| dc.title | Approximate sparse linear regression | |
| dc.type | Article | |
| dc.identifier.citation | Har-Peled, S., P. Indyk, and S. Mahabadi. "Approximate Sparse Linear Regression [Arxiv]." arXiv (2016): 19 pp. | |
| dc.contributor.department | Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science | |
| dc.relation.journal | Leibniz International Proceedings in Informatics, LIPIcs | |
| dc.eprint.version | Final published version | |
| dc.type.uri | http://purl.org/eprint/type/ConferencePaper | |
| eprint.status | http://purl.org/eprint/status/NonPeerReviewed | |
| dc.date.updated | 2019-05-31T14:57:59Z | |
| dspace.orderedauthors | Har-Peled, S; Indyk, P; Mahabadi, S | |
| dspace.date.submission | 2019-05-31T14:58:03Z | |
| mit.journal.volume | 107 | |
| mit.metadata.status | Authority Work and Publication Information Needed | |
