All the shapes of spaces: a census of small 3-manifolds

Abstract

In this work we present a complete (no misses, no duplicates) census for closed, connected, orientable and prime 3-manifolds induced by plane graphs with a bipartition of its edge set (blinks) up to k=9 edges. Blinks form a universal encoding for such manifolds. In fact, each such a manifold is a subtle class of blinks, lins2013B. Blinks are in 1-1 correpondence with blackboard framed links, kauffman1991knots, kauffman1994tlr We hope that this census becomes as useful for the study of concrete examples of 3-manifolds as the tables of knots are in the study of knots and links.