eprintid: 13620
rev_number: 7
eprint_status: archive
userid: 353
dir: disk0/00/01/36/20
datestamp: 2016-08-08 14:11:50
lastmod: 2021-08-27 17:41:27
status_changed: 2016-08-08 14:11:50
type: article
metadata_visibility: show
item_issues_count: 1
creators_name: Ge, R.
creators_id: AL1639
title: Optimal choice of linear interval extension
ispublished: pub
abstract: A basic problem in interval analysis is to find more accurate interval extension of a function on a given interval. The more accurate interval extension is, the less computation is needed in the solution of a problem, and the more useful the analysis is in other applications. As the first step, this paper investigates the optimal choice of linear interval extension. It is found that one only needs to calculate function values at two particular points in order to find the optimal interval extension generated by linear interval extensions.
date: 1989-03
date_type: published
id_number: 10.1016/0096-3003(89)90149-5
creators_browse_id: 2669
full_text_status: none
publication: Applied Mathematics and Computation
volume: 30
number: 2
pagerange: 165-189
refereed: TRUE
issn: 00963003
coversheets_dirty: FALSE
fp7_project: no
fp7_type: info:eu-repo/semantics/article
citation:   Ge, R. <https://pure.iiasa.ac.at/view/iiasa/2669.html>  (1989).  Optimal choice of linear interval extension.   Applied Mathematics and Computation 30 (2) 165-189. 10.1016/0096-3003(89)90149-5 <https://doi.org/10.1016/0096-3003%2889%2990149-5>.