Shrinking Without Doing Much At All

Abstract

In 1952 Bing astonished the mathematical world with his wild involution on S3. It has been among the most seminal examples in topology. The example depends on finding shrinking homeomorphisms of Bing's decomposition of S3 into points and arcs. If Bing's original homeomorphisms are varied, Bing's original wild involution changes by conjugation, which preserves some analytic properties fs22 while altering others. In 1988, Bing published a second paper "Shrinking Without Lengthening," answering a question that one of the present authors posed to him in an effort to understand the geometry of the entire conjugacy class. In this paper we produce a counterintuitive construction, namely, a method to shrink the Bing decomposition doing almost nothing at all--neither lengthening much nor rotating much.