Five tori in S4

Abstract

Ivansic proved that there is a link L of five tori in S4 with hyperbolic complement. We describe L explicitly with pictures, study its properties, and discover that L is in many aspects similar to the Borromean rings in S3. In particular the following hold: (1) Any two tori in L are unlinked, but three are not; (2) The complement M = S4 L is integral arithmetic hyperbolic; (3) The symmetry group of L acts k-transitively on its components for all k; (4) The double branched covering over L has geometry H2 × H2; (5) The fundamental group of M has a nice presentation via commutators; (6) The Alexander ideal has an explicit simple description; (7) Every class x ∈ H1(M,Z) = Z5 with non-zero xi is represented by a perfect circle-valued Morse function; (8) By longitudinal Dehn surgery along L we get a closed 4-manifold with fundamental group Z5; (9) The link L can be put in perfect position. This leads also to the first descriptions of a cusped hyperbolic 4-manifold as a complement of tori in RP4 and as a complement of some explicit Lagrangian tori in the product of two surfaces of genus two.