Point process of clusters for a stationary Gaussian random field on a lattice
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Publication:6546057
DOI10.37190/0208-4147.00145zbMATH Open1539.60061MaRDI QIDQ6546057
Publication date: 29 May 2024
Published in: Probability and Mathematical Statistics (Search for Journal in Brave)
Random fields (60G60) Gaussian processes (60G15) Extreme value theory; extremal stochastic processes (60G70)
Cites Work
- Maxima of a triangular array of multivariate Gaussian sequence
- Simulation of Brown-Resnick processes
- The asymptotic distribution of the maxima of a Gaussian random field on a lattice
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- Extremes of order statistics of stationary processes
- An approximation to cluster size distribution of two Gaussian random fields conjunction with application to fMRI data
- Extremal behavior of squared Bessel processes attracted by the Brown-Resnick process
- Joint behavior of point processes of clusters and partial sums for stationary bivariate Gaussian triangular arrays
- Extremes and limit theorems for difference of chi-type processes
- Maxima of discretely sampled random fields, with an application to 'bubbles'
- Extreme values of independent stochastic processes
- False Discovery Control for Random Fields
- Extremes and local dependence in stationary sequences
- Asymptotic Independence of the Numbers of High and Low Level Crossings of Stationary Gaussian Processes
- Spatial statistics: methodological aspects and applications
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