Abstract
In this paper, a strong form in ideal topological spaces of weak θ -pre continuity, called weak θ -pre-I continuity, is introduced. It is shown that weak θ -pre-I continuity is strictly weaker than strong θ -pre-I continuity and that it is between continuity and almost weak continuity. Also, additional properties of these functions are investigated.
Cuvinte cheie
weakly θ -pre-I-continuous functions
contra θ -pre-I continuous functions
pre I- θ -closed functions