Abstract
A new class of functions called 'pseudo strongly θ-continuous' functions is introduced. Their place in the hierarchy of variants of continuity which already exist in the literature is highlighted. The interplay between topological properties and pseudo strong θ-continuity is investigated.
Cuvinte cheie
strongly θ-continuous function
d_{δ}-map
slightly continuous function
D_{δ}T₀-space
D_{δ}-completely regular space
D_{δ}-supercontinuous function
weakly D_{δ}-normal space