For a Tychonoff space X, we use ↓USCF(X) and↓CF(X) to denote the families of the hypographs of all semi-continuous maps and of all continuous maps from X to I = [0, 1] with the subspace topologies of the hypersp...For a Tychonoff space X, we use ↓USCF(X) and↓CF(X) to denote the families of the hypographs of all semi-continuous maps and of all continuous maps from X to I = [0, 1] with the subspace topologies of the hyperspace Cldf(X × I) consisting of all non-empty closed sets in X × I endowed with the Fell topology. In this paper, we shall show that there exists a homeomorphism h: ↓USCF(X) → Q = [-1, 1]^∞ such that h(↓ CF(X)) : co : {(Xn) E Q | limn→ ∞ xn = O} if and only if X is a locally compact separable metrizable space and the set of isolated points is not dense in X.展开更多
基金Supported by National Natural Science Foundation of China (Grant No.10971125)
文摘For a Tychonoff space X, we use ↓USCF(X) and↓CF(X) to denote the families of the hypographs of all semi-continuous maps and of all continuous maps from X to I = [0, 1] with the subspace topologies of the hyperspace Cldf(X × I) consisting of all non-empty closed sets in X × I endowed with the Fell topology. In this paper, we shall show that there exists a homeomorphism h: ↓USCF(X) → Q = [-1, 1]^∞ such that h(↓ CF(X)) : co : {(Xn) E Q | limn→ ∞ xn = O} if and only if X is a locally compact separable metrizable space and the set of isolated points is not dense in X.
