Abstract

The classical theorem of Zareckiı̆ about regular relations is slightly extended and an intrinsic characterization of regularity is given. Based on the extended Zareckiı̆ theorem and the intrinsic characterization of regularity, we give a characterization of the strict complete regularity of ordered spaces by means of a certain regular relation between the closed and the open upper sets. As an application, it is shown that a quasicontinuous domain endowed with the Lawson topology is strictly completely regular, provided that the Lawson-open lower sets are contained in the lower topology. By means of regular relations we present a new proof of the strict Tychonoff embedding theorem for strictly completely regular ordered spaces.

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