Spaces determined by selections

A function is a called a weak selection if ψ({x,y})∈{x,y} for every x,y∈X. To each weak selection ψ, one associates a topology τψ, generated by the sets and . Answering a question of S. García-Ferreira and A.H. Tomita S. García-Ferreira, A.H. Tomita, A non-normal topology generated by a two-point selection, Topology Appl. 155 (10) (2008) 1105-1110], we show that (X,τψ) is completely regular for every weak selection ψ. We further investigate to what extent the existence of a continuous weak selection on a topological space determines the topology of X. In particular, we answer two questions of V. Gutev and T. Nogura V. Gutev, T. Nogura, Selection problems for hyperspaces, in: E. Pearl (Ed.), Open Problems in Topology 2, Elsevier B.V., 2007, pp. 161-170].