Second-order comparison of three fundamental tessellation models
DOI10.1080/02331888.2011.586458zbMath1440.60013OpenAlexW2085654022MaRDI QIDQ5299475
Christoph Thäle, Claudia Redenbach
Publication date: 25 June 2013
Published in: Unnamed Author (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/02331888.2011.586458
stochastic geometrypair-correlation functionSTIT tessellationPoisson hyperplane tessellationPoisson Voronoi tessellationvariance of characteristics
Inference from spatial processes (62M30) Geometric probability and stochastic geometry (60D05) Point processes (e.g., Poisson, Cox, Hawkes processes) (60G55) Random convex sets and integral geometry (aspects of convex geometry) (52A22)
Related Items (4)
Cites Work
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- Three-dimensional convex hull as a fruitful source of diagrams
- Limit theorems for functionals on the facets of stationary random tessellations
- Mixing properties for STIT tessellations
- Erratum: Second-order properties of the point process of nodes in a stationary Voronoi tessellation
- Second-order properties and central limit theory for the vertex process of iteration infinitely divisible and iteration stable random tessellations in the plane
- NEW MEAN VALUES FOR HOMOGENEOUS SPATIAL TESSELLATIONS THAT ARE STABLE UNDER ITERATION
- SECOND MOMENT MEASURE AND K-FUNCTION FOR PLANAR STIT TESSELLATIONS
- Stochastic and Integral Geometry
- MEAN VALUES FOR HOMOGENEOUS STIT TESSELLATIONS IN 3D
- The quickhull algorithm for convex hulls
- Random tessellations in ℝd
- Second‐order properties of the point process of nodes in a stationary Voronoi tessellation
- Crack STIT tessellations: characterization of stationary random tessellations stable with respect to iteration
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