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Capacity of the range of random walk on $\mathbb Z^4$
- Source :
- Ann. Probab. 47, no. 3 (2019), 1447-1497
- Publication Year :
- 2016
- Publisher :
- HAL CCSD, 2016.
-
Abstract
- We study the scaling limit of the capacity of the range of a random walk on the integer lattice in dimension four. We establish a strong law of large numbers and a central limit theorem with a non-Gaussian limit. The asymptotic behaviour is analogous to that found by Le Gall in ’86 [Comm. Math. Phys. 104 (1986) 471–507] for the volume of the range in dimension two.
- Subjects :
- Statistics and Probability
60G50
[MATH.MATH-PR] Mathematics [math]/Probability [math.PR]
Central limit theorem
Integer lattice
Law of large numbers
01 natural sciences
010104 statistics & probability
Mathematics::Probability
Dimension (vector space)
60F05
FOS: Mathematics
60F50
Limit (mathematics)
0101 mathematics
Mathematics
Discrete mathematics
Capacity
Probability (math.PR)
010102 general mathematics
Random walk
Green kernel
[MATH.MATH-PR]Mathematics [math]/Probability [math.PR]
Range (mathematics)
Scaling limit
Statistics, Probability and Uncertainty
Mathematics - Probability
Subjects
Details
- Language :
- English
- Database :
- OpenAIRE
- Journal :
- Ann. Probab. 47, no. 3 (2019), 1447-1497
- Accession number :
- edsair.doi.dedup.....50c47c323fe0fcf362ec2275bc8cf06e