Add to ORKGThe main purpose of this paper is to describe two examples. The first is that of an almost continuous, Baire class two, non-extendable function f:[0,1]--\u3e[0,1] with a G\delta graph. This answers a question of Gibson. The second example is that of a connectivity function F:R2--\u3eR with dense graph such that F-1(0) is contained in a countable union of straight lines. This easily implies the existence of an extendable function f:R--\u3eR with dense graph such that f-1(0) is countable. We also give a sufficient condition for a Darboux function f:[0,1]--\u3e[0,1] with a G\delta graph whose closure is bilaterally dense in itself to be quasicontinuous and extendable
ABSTRACT. Let X be a compact metric space, K a closed subset of X, Y a Banach space, and g: K- • Y a...
A function f : R → R is: almost continuous in the sense of Stallings, f ∈ AC, if each open set G ⊂ R...
summary:A function $f:X\rightarrow Y$ is said to be almost quasicontinuous at $x\in X$ if $x\in C\le...
The main purpose of this paper is to describe two examples. The first is that of an almost continuou...
AbstractIn this note we will construct, under the assumption that union of less than continuum many ...
Let F be a family of real functions, F ⊆ R R . In the paper we will examine the following question. ...
In the paper we present an exhaustive discussion of the relations between Darboux-like functions wit...
In the paper we prove that an additive Darboux function f : R → R can be expressed as a composition ...
AbstractIn the paper we present an exhaustive discussion of the relations between Darboux-like funct...
Using complex methods combined with Baire’sTheorem, we show that one-sided extendability, extendabil...
In his classic paper, Stallings [7] asked if a connec tivity function I ~ I could always be extended...
AbstractA function f:Rn→R is a connectivity function if for every connected subset C of Rn the graph...
whenever a function of Baire class 1, f: I + I, has the Darboux property, then that function is a co...
We give more properties and applications to the class of somewhat nearly continuous functions introd...
In this note we will construct several additive Darboux-like functions f : R → R answering some prob...
ABSTRACT. Let X be a compact metric space, K a closed subset of X, Y a Banach space, and g: K- • Y a...
A function f : R → R is: almost continuous in the sense of Stallings, f ∈ AC, if each open set G ⊂ R...
summary:A function $f:X\rightarrow Y$ is said to be almost quasicontinuous at $x\in X$ if $x\in C\le...
The main purpose of this paper is to describe two examples. The first is that of an almost continuou...
AbstractIn this note we will construct, under the assumption that union of less than continuum many ...
Let F be a family of real functions, F ⊆ R R . In the paper we will examine the following question. ...
In the paper we present an exhaustive discussion of the relations between Darboux-like functions wit...
In the paper we prove that an additive Darboux function f : R → R can be expressed as a composition ...
AbstractIn the paper we present an exhaustive discussion of the relations between Darboux-like funct...
Using complex methods combined with Baire’sTheorem, we show that one-sided extendability, extendabil...
In his classic paper, Stallings [7] asked if a connec tivity function I ~ I could always be extended...
AbstractA function f:Rn→R is a connectivity function if for every connected subset C of Rn the graph...
whenever a function of Baire class 1, f: I + I, has the Darboux property, then that function is a co...
We give more properties and applications to the class of somewhat nearly continuous functions introd...
In this note we will construct several additive Darboux-like functions f : R → R answering some prob...
ABSTRACT. Let X be a compact metric space, K a closed subset of X, Y a Banach space, and g: K- • Y a...
A function f : R → R is: almost continuous in the sense of Stallings, f ∈ AC, if each open set G ⊂ R...
summary:A function $f:X\rightarrow Y$ is said to be almost quasicontinuous at $x\in X$ if $x\in C\le...