Largest and Smallest Area Triangles on Imprecise Points

Publication date

2017

Authors

Keikha, VahidehISNI 0000000523925003
Löffler, MaartenISNI 000000039666142X
Mohades, Ali

Editors

Advisors

Supervisors

DOI

Document Type

Part of book
Open Access logo

License

taverne

Abstract

In this paper we study the following problem: we are given a set of imprecise points modeled as parallel line segments, and we wish to place three points in different regions such that the resulting triangle has the largest or smallest possible area. We first present some facts about this problem in the context of imprecise points, then we show that for a given set of line segments of equal length the largest possible area triangle can be found in $O(n log n)$ time, and for line segments of arbitrary length the problem can be solved in $O(n^2)$ time. We also show that the smallest possible area triangle for a set of arbitrary length parallel line segments can be found in $O(n^2)$ time.

Keywords

CG, IMP, Taverne

Citation

Keikha, V, Löffler, M & Mohades, A 2017, Largest and Smallest Area Triangles on Imprecise Points. in Proc. 33rd European Workshop on Computational Geometry : EuroCG 2017. pp. 125-128.