Supercritical holes for the doubling map

Abstract

For a map S:X X and an open connected set (= a hole) H⊂ X we define JH(S) to be the set of points in X whose S-orbit avoids H. We say that a hole H0 is supercritical if (i) for any hole H such that H0⊂ H the set JH(S) is either empty or contains only fixed points of S; (ii) for any hole H such that ⊂ H0 the Hausdorff dimension of JH(S) is positive. The purpose of this note to completely characterize all supercritical holes for the doubling map Tx=2x1.