Graphs on 21 edges that are not 2--apex

Abstract

We show that the 20 graph Heawood family, obtained by a combination of triangle-Y and Y-triangle moves on K7, is precisely the set of graphs of at most 21 edges that are minor minimal for the property not 2--apex. As a corollary, this gives a new proof that the 14 graphs obtained by triangle-Y moves on K7 are the minor minimal intrinsically knotted graphs of 21 or fewer edges. Similarly, we argue that the seven graph Petersen family, obtained from K6, is the set of graphs of at most 17 edges that are minor minimal for the property not apex.