2-dimensional Convex Hull, Online: Difference between revisions

Latest revision as of 08:19, 10 April 2023

Here, we are given the input points one by one, and must maintain the current convex hull after each input point.

$n$: number of line segments

$h$: number of points on the convex hull

Name	Year	Time	Space	Approximation Factor	Model	Reference
Incremental convex hull algorithm; Michael Kallay	1984	$O(n \log n)$		Exact	Deterministic	Time
Online 2-d Convex Hull, Preparata	1979	$O(logn)$ per operation, $O(n*log(n)$) total	$O(n)$	Exact	Deterministic	Time

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 == Parameters ==
-n: number of line segments
+$n$: number of line segments
-h: number of points on the convex hull
+$h$: number of points on the convex hull
 == Table of Algorithms ==
@@ Line 24: / Line 24: @@
 |-
-| [[Incremental convex hull algorithm; Michael Kallay ( Convex Hull)|Incremental convex hull algorithm; Michael Kallay]] || 1984 || $O(n log n)$ ||  || Exact || Deterministic || [https://www-sciencedirect-com.ezproxy.canberra.edu.au/science/article/pii/002001908490084X Time]
+| [[Incremental convex hull algorithm; Michael Kallay ( Convex Hull)|Incremental convex hull algorithm; Michael Kallay]] || 1984 || $O(n \log n)$ ||  || Exact || Deterministic || [https://www-sciencedirect-com.ezproxy.canberra.edu.au/science/article/pii/002001908490084X Time]
 |-
 | [[Online 2-d Convex Hull, Preparata (2-dimensional Convex Hull, Online Convex Hull)|Online 2-d Convex Hull, Preparata]] || 1979 || $O(logn)$ per operation, $O(n*log(n)$) total || $O(n)$ || Exact || Deterministic || [https://dl-acm-org.ezproxy.canberra.edu.au/doi/abs/10.1145/359131.359132 Time]