Connectedness in structures on the real numbers: o-minimality and undecidability

Abstract

We initiate an investigation of structures on the set of real numbers having the property that path components of definable sets are definable. All o-0ptminimal structures on (R,<) have the property, as do all expansions of (R,+,·,N). Our main analytic-geometric result is that any such expansion of (R,<,+) by boolean combinations of open sets (of any arities) either is o-0ptminimal or defines an isomorph of ( N,+,·\,). We also show that any given expansion of (R, <, +,N) by subsets of Nn (n allowed to vary) has the property if and only if it defines all arithmetic sets. Variations arise by considering connected components or quasicomponents instead of path components.