Achirality of Sol 3-Manifolds, Stevenhagen Conjecture and Shimizu's L-series

Abstract

A closed orientable manifold is achiral if it admits an orientation reversing homeomorphism. A commensurable class of closed manifolds is achiral if it contains an achiral element, or equivalently, each manifold in has an achiral finite cover. Each commensurable class containing non-orientable elements must be achiral. It is natural to wonder how many commensurable classes are achiral and how many achiral classes have non-orientable elements. We study this problem for Sol 3-manifolds. Each commensurable class of Sol 3-manifold has a complete topological invariant D, the discriminant of . Our main result is: (1) Among all commensurable classes of Sol 3-manifolds, there are infinitely many achiral classes; however ordered by discriminants, the density of achiral commensurable classes is 0. (2) Among all achiral commensurable classes of Sol 3-manifolds, ordered by discriminants, the density of classes containing non-orientable elements is 1-, where :=Πj=1∞ (1+2-j)-1 = 0.41942·s.