Abstract
In this work, we present and study new ordered separation axioms, namely supra T-ci-ordered spaces (briefly, STci-ordered spaces), where i = 0, 1/2, 11/2, 2. With the help of examples, we illustrate the relationships among these ordered spaces and point out under what conditions they are hereditary properties. Also, we derive some results which associate some of STci-ordered spaces with some topological notions such as supra limit points and supra disconnected spaces, and with some algebraic notions such as largest and smallest elements. Furthermore, we investigate the image of theses ordered spaces under S*homeomorphism maps. Finally, we verify that the finite ordered product of STci-ordered spaces is STci-ordered for i = 0, 1/2, 1, 11/2.