2001
DOI: 10.1214/aoap/1015345393
|View full text |Cite
|
Sign up to set email alerts
|

Central Limit Theorems for Some Graphs in Computational Geometry

Abstract: Let B n be an increasing sequence of regions in d-dimensional space with volume n and with union d . We prove a general central limit theorem for functionals of point sets, obtained either by restricting a homogeneous Poisson process to B n , or by by taking n uniformly distributed points in B n . The sets B n could be all cubes but a more general class of regions B n is considered. Using this general result we obtain central limit theorems for specific functionals such as total edge length and number of compo… Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1
1

Citation Types

11
455
0
3

Year Published

2006
2006
2016
2016

Publication Types

Select...
6

Relationship

2
4

Authors

Journals

citations
Cited by 168 publications
(469 citation statements)
references
References 22 publications
11
455
0
3
Order By: Relevance
“…whereG 1 has distribution given by (16 (iii) For α > 1, the distribution of the limit W (1, α) of (4) is given by…”
Section: The On-line Nearest-neighbour Graphmentioning
confidence: 99%
See 3 more Smart Citations
“…whereG 1 has distribution given by (16 (iii) For α > 1, the distribution of the limit W (1, α) of (4) is given by…”
Section: The On-line Nearest-neighbour Graphmentioning
confidence: 99%
“…(e) Figure 3 is a plot of the estimated probability density function ofG 1 given by (16). This was obtained by performing 10 5 repeated simulations of the ONG on a sequence of 10 3 uniform (simulated) random points on (0, 1).…”
Section: The On-line Nearest-neighbour Graphmentioning
confidence: 99%
See 2 more Smart Citations
“…The random variables V and S are of fundamental interest in stochastic geometry, see [16] and [21]. If n → ∞ and ρ remains fixed, both V and S satisfy a central limit theorem [16,20,23]. The L 1 distance of V , properly standardized, to the normal is studied in [7] using Stein's method.…”
Section: An Application To Coverage Processesmentioning
confidence: 99%