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Topics in Voronoi and Johnson—Mehl tessellations
| Content Provider | Scilit |
|---|---|
| Author | Møller, J. |
| Copyright Year | 2019 |
| Description | The study of random tessellations is one of the major subjects in stochastic geometry, see e.g. Stoyan, Kendall and Mecke (1995). A tessellation is roughly speaking a subdivision of the space into sets called cells, crystal, tiles etc. depending on the particular application. By 'space' is usually meant the d-dimensional Euclidean space $ℝ^{ d }$, d ≥ 2, and it is often assumed that the cells are bounded convex d-dimensional polytopes. Typically, the random mechanism is given by some stochastic process of simple geometrical objects which generate the tessellation in accordance to some rules. Book Name: Stochastic Geometry |
| Related Links | https://content.taylorfrancis.com/books/download?dac=C2006-0-01439-2&isbn=9780203738276&doi=10.1201/9780203738276-5&format=pdf |
| Ending Page | 198 |
| Page Count | 26 |
| Starting Page | 173 |
| DOI | 10.1201/9780203738276-5 |
| Language | English |
| Publisher | Informa UK Limited |
| Publisher Date | 2019-06-10 |
| Access Restriction | Open |
| Subject Keyword | Book Name: Stochastic Geometry Applied Mathematics Tessellation Stochastic Johnson Crystal Polytopes Voronoi |
| Content Type | Text |
| Resource Type | Chapter |
