Centroidal voronoi Tessellations Are Not Good Jigsaw Puzzles
标签: Tessellations Centroidal voronoi Puzzles
上传时间: 2017-04-07
上传用户:003030
一个新的voronoi算法实现,可参照文档
上传时间: 2013-12-25
上传用户:阳光少年2016
一个很不错的求voronoi线与最小凸壳的vc++源程序
上传时间: 2013-12-30
上传用户:www240697738
著名的Steven fortun 算法的具体描述,如何实现算法步骤,对于研究voronoi Diagram有极大的帮助
上传时间: 2014-01-14
上传用户:linlin
Part I provides a compact survey on classical stochastic geometry models. The basic models defined in this part will be used and extended throughout the whole monograph, and in particular to SINR based models. Note however that these classical stochastic models can be used in a variety of contexts which go far beyond the modeling of wireless networks. Chapter 1 reviews the definition and basic properties of Poisson point processes in Euclidean space. We review key operations on Poisson point processes (thinning, superposition, displacement) as well as key formulas like Campbell’s formula. Chapter 2 is focused on properties of the spatial shot-noise process: its continuity properties, its Laplace transform, its moments etc. Both additive and max shot-noise processes are studied. Chapter 3 bears on coverage processes, and in particular on the Boolean model. Its basic coverage characteristics are reviewed. We also give a brief account of its percolation properties. Chapter 4 studies random tessellations; the main focus is on Poisson–voronoi tessellations and cells. We also discuss various random objects associated with bivariate point processes such as the set of points of the first point process that fall in a voronoi cell w.r.t. the second point process.
标签: Stochastic Geometry Networks Wireless Volume and
上传时间: 2020-06-01
上传用户:shancjb
