SX-convergence and locally hypercompact spaces

Abstract

In this paper, we give a topological version of Scott convergence theorem for locally hypercompact spaces. We introduce the notion of S*X-convergence on a T0 topological space X, and define the notion of finitely approximated spaces. Monotone determined spaces are natural topological extensions of dcpos. The main results are: (1) A monotone determined space X is a locally hypercompact space iff S*X-convergence is topological. (2) For a T0 space X, S*X-convergence is topological iff X is a finitely approximating space. (3) If the Lawson topology on a monotone determined space X is compact, then X is a dcpo endowed with the Scott topology.