Radial departures and plane embeddings of arc-like continua

Abstract

We study the problem of Nadler and Quinn from 1972, which asks whether, given an arc-like continuum X and a point x ∈ X, there exists an embedding of X in R2 for which x is an accessible point. We develop the notion of a radial departure of a map f [-1,1] [-1,1], and establish a simple criterion in terms of the bonding maps in an inverse system on intervals to show that there is an embedding of the inverse limit for which a given point is accessible. Using this criterion, we give a partial affirmative answer to the problem of Nadler and Quinn, under some technical assumptions on the bonding maps of the inverse system.