Porosity in Spaces of Darboux-Like Functions

Abstract: It is known that the six Darboux-like function spaces of continuous, extendable, almost continuous, connectivity, Darboux, and peripherally continuous functions f : R → R, with the metric of uniform convergence, form a strictly increasing chain of subspaces. We denote these spaces by C, Ext, AC, Conn, D, and PC, respectively. We show that C and D are porous and AC and Conn are not porous in their successive spaces of this chain.1. f ∈ PC if the graph of f is bilaterally dense in itself.2. f ∈ D if f (J) is con… Show more

“…The following chart, in which → indicates proper inclusion, was lifted from [10] and [6]. In [13], we determine which spaces are porous or boundary sets for the chain of spaces of functions f : R → R in the top row of the chart. We indicate in the rest of the chart which function spaces are determined in this paper to be porous or boundary sets.…”

Porous and Boundary Sets in Darboux-Like Function Spaces

“…The following chart, in which → indicates proper inclusion, was lifted from [10] and [6]. In [13], we determine which spaces are porous or boundary sets for the chain of spaces of functions f : R → R in the top row of the chart. We indicate in the rest of the chart which function spaces are determined in this paper to be porous or boundary sets.…”

Porous and Boundary Sets in Darboux-Like Function Spaces

On some generalization of the notion of continuity. Category case

Families of Darboux functions and topology having (J⁎)-property