We introduce the new concept of pointwise measurability. It is shown in this paper that a measurable function is measurable at each point and that for a large class of topological spaces the converse also holds. Moreover it can be seen that a function which is continuous at a point is Borel-measurable at this point too. Furthermore the set of measurability points is considered. If the range space is a $\sigma$-compact metric space, then this set is a $G_{\delta}$-set; if the range space is only a Polish space this is in general not true any longer
A Polish space is a separable topological space that can be metrized by means of a complete metric. ...
A function f:R -> R is approximately continuous iff it is continuous in the density topology, i.e., ...
Measures and measurable functions are used primarily as tools for carrying out various calculations ...
AbstractLebesgue proved that every separately continuous function f:R×R→R is a pointwise limit of co...
This paper continues the investigation begun in [M.R. Burke, Topology Appl. 129 (2003) 29-65] into t...
ABSTRACT. We study sets on which measurable real-valued functions on a measur-able space with neglig...
AbstractThis paper continues the investigation begun in [M.R. Burke, Topology Appl. 129 (2003) 29–65...
In the paper to the definition of measurability of set-valued functions such a a-algebra is pres...
AbstractWe construct measurable selections for closed set-valued maps into arbitrary complete metric...
The investigation of computational properties of discontinuous functions is an important concern in ...
This thesis gives a more detailed version of a proof from Daniel Mauldin that the set of continuous ...
The paper presents a new type of density topology on the real line generated by the pointwise conver...
Galileo suggested that what is not measurable be made measurable. It is this principle which undersc...
AbstractWe establish here some inequalities between distances of pointwise bounded subsets H of RX t...
Abstract. The concept of measurability of real-valued functions with re-spect to various classes of ...
A Polish space is a separable topological space that can be metrized by means of a complete metric. ...
A function f:R -> R is approximately continuous iff it is continuous in the density topology, i.e., ...
Measures and measurable functions are used primarily as tools for carrying out various calculations ...
AbstractLebesgue proved that every separately continuous function f:R×R→R is a pointwise limit of co...
This paper continues the investigation begun in [M.R. Burke, Topology Appl. 129 (2003) 29-65] into t...
ABSTRACT. We study sets on which measurable real-valued functions on a measur-able space with neglig...
AbstractThis paper continues the investigation begun in [M.R. Burke, Topology Appl. 129 (2003) 29–65...
In the paper to the definition of measurability of set-valued functions such a a-algebra is pres...
AbstractWe construct measurable selections for closed set-valued maps into arbitrary complete metric...
The investigation of computational properties of discontinuous functions is an important concern in ...
This thesis gives a more detailed version of a proof from Daniel Mauldin that the set of continuous ...
The paper presents a new type of density topology on the real line generated by the pointwise conver...
Galileo suggested that what is not measurable be made measurable. It is this principle which undersc...
AbstractWe establish here some inequalities between distances of pointwise bounded subsets H of RX t...
Abstract. The concept of measurability of real-valued functions with re-spect to various classes of ...
A Polish space is a separable topological space that can be metrized by means of a complete metric. ...
A function f:R -> R is approximately continuous iff it is continuous in the density topology, i.e., ...
Measures and measurable functions are used primarily as tools for carrying out various calculations ...