Depending on the relative
orientations of the two components the
linking number of the Hopf link is ±1. The Hopf link is a (2,2)-
torus link with the
braid word \sigma_1^2. The
knot complement of the Hopf link is
R ×
S1 ×
S1, the
cylinder over a
torus. This space has a
locally Euclidean geometry, so the Hopf link is not a
hyperbolic link. The
knot group of the Hopf link (the
fundamental group of its complement) is
Z2 (the
free abelian group on two generators), distinguishing it from an unlinked pair of loops which has the
free group on two generators as its group. The Hopf-link is not
tricolorable: it is not possible to color the strands of its diagram with three colors, so that at least two of the colors are used and so that every crossing has one or three colors present. Each link has only one strand, and if both strands are given the same color then only one color is used, while if they are given different colors then the crossings will have two colors present. ==Hopf bundle==