The r-version of the WRTr-invariants, monochromatic 3-connected blinks and evidence for a conjecture on their induced 3-manifolds

Abstract

A blink is a plane graph with a bipartition (black, gray) of its edges. Subtle classes of blinks are in 1-1 correspondence with closed, oriented and connected 3-manifolds up to orientation preserving homeomorphisms lins2013B. Switching black and gray in a blink B, giving -B, reverses the manifold orientation. The dual of the blink B in the sphere S2 is denoted by B . Blinks B and -B induce the same 3-manifold. The paper reinforces the Conjecture that if B' \B,-B\, then the monochromatic 3-connected (mono3c) blinks B and B' induce distinct 3-manifolds. Using homology of covers and length spectra, we conclude the topological classification of 708 mono3c blinks that were organized in equivalence classes by WRT-invariants in lins2007blink. We also present a reformulation of the combinatorial algorithm to obtain the WRT-invariants of lins1995gca using only the blink.