Abstract
Shabir et. al [27] and D. N. Georgiou et. al [7], defined and studied some soft separation axioms, soft theta-continuity and soft connectedness in soft spaces using (ordinary) points of a topological space X. In this paper, we redefine and explore several properties of soft T-i, i = 0; 1; 2, soft regular, soft T-3, soft normal and soft T-4 axioms using soft points defined by I. Zorlutuna [30]. We also discuss some soft invariance properties namely soft topological property and soft hereditary property. We hope that these results will be useful for the future study on soft topology to carry out general framework for the practical applications and to solve the complicated problems containing uncertainties in economics, engineering, medical, environment and in general man-machine systems of various types.