2-dimensional Convex Hull: Difference between revisions

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| [[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]
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| [[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]
|-
| [[Dynamic 2-d Convex Hull, Overmars and van Leeuwen (2-dimensional Convex Hull, Dynamic Convex Hull)|Dynamic 2-d Convex Hull, Overmars and van Leeuwen]] || 1980 || $O(log^{2}(n)$) per operation, $O(n*log^{2}(n)$) total ||  || Exact || Deterministic || [https://www-sciencedirect-com.ezproxy.canberra.edu.au/science/article/pii/002200008190012X?via%3Dihub Time]
|-
| [[(many more...) (2-dimensional Convex Hull, Dynamic Convex Hull)|(many more...)]] ||  ||  ||  || Exact || Deterministic || 
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|}
|}

Revision as of 13:04, 15 February 2023

Description

The convex hull or convex envelope or convex closure of a set X of points in the Euclidean plane or in a Euclidean space (or; more generally; in an affine space over the reals) is the smallest convex set that contains X. Here, we are looking at the 2-dimensional case.

Related Problems

Generalizations: d-dimensional Convex Hull

Subproblem: 2-dimensional Convex Hull, Online, 2-dimensional Convex Hull, Dynamic

Related: 3-dimensional Convex Hull, 2-dimensional Convex Hull, Dynamic

Parameters

n: number of line segments

h: number of points on the convex hull

Table of Algorithms

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
Dynamic 2-d Convex Hull, Overmars and van Leeuwen 1980 $O(log^{2}(n)$) per operation, $O(n*log^{2}(n)$) total Exact Deterministic Time
(many more...) Exact Deterministic

References/Citation

https://ecommons.cornell.edu/handle/1813/6417

https://ecommons.cornell.edu/handle/1813/6417