Fundamental rings for classes of Darboux functions (Q1823332)

Let D be the class of Darboux functions and P a ring of functions \(R\to R.\) For \(H\subset D,\) let P(H) be the ring generated by \(P\cup H.\) Then P is fundamental for \(H\subset D,\) if \(P(H)\subset D.\) Two families \(G,H\subset D\) are compatible if there is a ring \(P\subset D\) containing \(G\cup H.\) A class \({\mathcal P}\) of fundamental rings for \(H\subset D\) is complete if for any family G compatible with H there is some \(P\in {\mathcal P}\) fundamental for \(H\cup G.\) The main result: If \(H\subset D\) satisfies certain conditions then there is a class \({\mathcal T}\neq \emptyset\) of connected topologies on R, finer than the natural topology, such that the class C(\({\mathcal T})\) of continuous functions \((R,T)\to R,\) where \(T\in {\mathcal T},\) is the complete class of fundamental rings for H, satisfying some additional conditions.