Efficient multisections of odd-dimensional tori

Abstract

Rubinstein--Tillmann generalized the notions of Heegaard splittings of 3-manifolds and trisections of 4-manifolds by defining multisections of PL n-manifolds, which are decompositions into k= n/2+1 n-dimensional 1-handlebodies with nice intersection properties. For each odd-dimensional torus Tn, we construct a multisection which is efficient in the sense that each 1-handlebody has genus n, which we prove is optimal; each multisection is symmetric with respect to both the permutation action of Sn on the indices and the k translation action along the main diagonal. We also construct such a trisection of T4, lift all symmetric multisections of tori to certain cubulated manifolds, and obtain combinatorial identities as corollaries.