On the homotopy types of 4-dimensional toric orbifolds

Abstract

The cohomological rigidity problem for toric orbifolds asks when an integral cohomology isomorphism implies a homotopy equivalence. In this paper we reformulate the cohomological rigidity problem in the context of 4-dimensional toric orbifolds by introducing what we call proper isomorphisms, a variant of a concept studied by J.H.C. Whitehead. We prove that each proper isomorphism class of 4-dimensional toric orbifolds contains at most two distinct homotopy types, and that the two classifications agree in certain special circumstances.