A renewal approach to prove the Four Color Theorem unplugged, Part II: R/G/B Kempe chains in an extremum non-4-colorable MPG

Abstract

This is the second part of three episodes to demonstrate a renewal approach for proving the Four Color Theorem without checking by a computer. The first and the third episodes have subtitles: ``RGB-tilings on maximal planar graphs'' and ``Diamond routes, canal lines and -adjustments,'' where R/G/B stand for red, green and blue colors to paint on edges and an MPG stands for a maximal planar graph. We focus on an extremum non-4-colorable MPG EP in the whole paper. In this second part, we refresh the false proof on EP by Kempe for the Four Color Theorem. And then using single color tilings or RGB-tilings on EP, we offer a renewal point of view through R/G/B Kempe chains to enhance our coloring skill, either in vertex-colorings or in edge-colorings. We discover many fundamental theorems associated with R-/RGB-tilings and 4-colorability; an adventure study on One Piece, which is either an MPG or an n-semi-MPG; many if-and-only-if statements for EP-\e\ by using Type A or Type B e-diamond and Kempe chains. This work started on May 31, 2018 and was first announced by the author~Liu2020 on Jan.\ 22, 2020, when the pandemic just occurred.