Arak-Clifford-Surgailis tessellations. Basic properties and variance of the total edge length
From MaRDI portal
Publication:648133
DOI10.1007/s10955-011-0331-7zbMath1291.60023OpenAlexW1986023197MaRDI QIDQ648133
Publication date: 22 November 2011
Published in: Journal of Statistical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10955-011-0331-7
stochastic geometryrandom tessellationpair-correlation functionGibbs modificationpolygonal Markov field
Related Items (2)
How many T-tessellations on k lines? Existence of associated Gibbs measures on bounded convex domains ⋮ Discrete Multicolour Random Mosaics with an Application to Network Extraction
Cites Work
- Unnamed Item
- Non-homogeneous polygonal Markov fields in the plane: graphical representations and geometry of higher order correlations
- Markov fields with polygonal realizations
- Consistent polygonal fields
- Image segmentation by polygonal Markov fields
- The thermodynamic limit of polygonal models
- Second-order properties and central limit theory for the vertex process of iteration infinitely divisible and iteration stable random tessellations in the plane
- SECOND MOMENT MEASURE AND K-FUNCTION FOR PLANAR STIT TESSELLATIONS
- Stochastic and Integral Geometry
- On the Convergence Rate in Kolmogorov’s Uniform Limit Theorem. I
- Point-based polygonal models for random graphs
- Crack STIT tessellations: characterization of stationary random tessellations stable with respect to iteration
This page was built for publication: Arak-Clifford-Surgailis tessellations. Basic properties and variance of the total edge length
