The volume of simplices in high-dimensional Poisson–Delaunay tessellations
The volume of simplices in high-dimensional Poisson–Delaunay tessellations
Typical weighted random simplices $Z_{\mu}$, $\mu\in(-2,\infty)$, in a Poisson-Delaunay tessellation in $\mathbb{R}^n$ are considered, where the weight is given by the $(\mu+1)$st power of the volume. As special cases this includes the typical ($\mu=-1$) and the usual volume-weighted ($\mu=0$) Poisson-Delaunay simplex. By proving sharp bounds on cumulants it is shown …