L. C. Hoehn

A complete classification of homogeneous plane continua

We show that the only compact and connected subsets (i.e. continua) X of the plane

An uncountable family of copies of a non-chainable tree-like continuum in the plane

{\mathbb{R}^2}

A non-chainable plane continuum with span zero

R2 which contain more than one point and are homogeneous, in the sense that the group of homeomorphisms of X acts transitively on X, are, up to homeomorphism, the circle

Extension of isotopies in the plane.

{\mathbb{S}^1}

Homogeneity degree of fans

S1, the pseudo-arc, and the circle of pseudo-arcs. These latter two spaces are fractal-like objects which do not contain any arcs. It follows that any compact and homogeneous space in the plane has the form X × Z, where X is either a point or one of the three homogeneous continua above, and Z is either a finite set or the Cantor set.The main technical result in this paper is a new characterization of the pseudo-arc. Following Lelek, we say that a continuum X has span zero provided for every continuum C and every pair of maps