An infinite family of convex Brunnian links in $R^n$
arXiv:1101.4863 · doi:10.1007/s10711-011-9581-4
Abstract
This paper proves that convex Brunnian links exist for every dimension $n \geq 3$ by constructing explicit examples. These examples are three-component links which are higher-dimensional generalizations of the Borromean rings.
10 pages, 4 figures