Abstract
Let for positive integers j, k, d and convex bodies K of Euclidean d-space Ed of dimension at least j Vj, k (K) denote the maximum of the intrinsic volumes Vj(C) of those convex bodies whose j-skeleton skelj(C) can be covered with k translates of K. Then the j-th k-covering density θj,k (K) is the ratio k Vj(K)/Vj,k(K). In particular, θd,k refers to the case of covering the entire convex bodies C and the density is measured with respect to the volume while for j=d-1 the surface of the bodies C is covered and accordingly the density is measured with respect to the surface area. The paper gives the estimate {Mathematical expression} for the j-th k-covering density and some related results.
| Translated title of the contribution | On the j-th covering densities of convex bodies |
|---|---|
| Original language | German |
| Pages (from-to) | 207-220 |
| Number of pages | 14 |
| Journal | Monatshefte fur Mathematik |
| Volume | 103 |
| Issue number | 3 |
| DOIs | |
| State | Published - Sep 1987 |
| Externally published | Yes |