The aim of the article is to introduce a few variants of the generalized quasi-continuity of multifunctions defined on a bitopological space and to study their mutual relationship. The results known for functions are extended to multifunctions, which provide a wider range of relationships, mainly in terms of upper and lower semi-continuities and corresponding continuities with respect to a dual bitopology. The proof procedures are based on a notion of the pseudo-refinement of two topologies and the Baire property in a bitopological space. A characterization of some continuities depending on two topologies by continuities depending only on one topology and the structure of the sets of semi-discontinuity points are given. The equivalence between the upper and lower Baire continuity and upper and lower quasi-continuity (upper and lower continuity with respect to ideal topology) of compact-valued multifunction from a Baire space into a regular one has an important position. The end of this article is dedicated to several interpretations that facilitate and clarify orientation in the achieved results.
M. Matejdes (Thu,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: