Let X and Y be arbitrary sets. For arbitrary families 
and
, where 
stands for the collection of all subsets of a
set Z, define
and
If families 
and 
are the topologies on X and Y, respectively,
then 
is a well known object: the class of all continuous
functions from 
to 
. Similarly a class of measurable
functions with respect to an algebra of subsets of X is equal to
, where is an appropriate topology on Y.
In both these approaches one starts with families of sets
and and obtain, in return, a family of functions. But what if a class
of functions 
is given to begin with? When can we find families
and such that 
or
? And how nice can these families be, if they exist?
This questions have been studied recently by several authors. To talk about
their results, let us fix the following terminologies. We say that a family
can be
for some families and ;
for some families and ;
for some topologies on X and on Y;
and
for some family
and 
.
From all these notions only the problem of characterizing by associated sets
has been extensively studied. Clearly, all classes of continuous function
from a topological space X into 
(considered with the natural
topology) can be characterized by associated sets. So can be the family of
-measurable functions from X into , for any 
-algebra of
subsets of X. However, there are also many examples of classes of functions
that do not admit such a characterization. In fact, the real interest in the
characterizations of functions by associated sets has been initiated by
the 1950 paper of Zahorski [142], in which he tried to characterize
derivatives (from to ) in that way.
Today we know that derivatives
cannot be characterized by associated sets: any class 
that can be
characterized that way has the property that 
for every 
and every homeomorphism
; however derivatives do not have this property. (See
Bruckner's book [15] on this subject. Compare also [16].) This
negative result has been followed by several others, in which the authors prove
that the following classes of functions (from to ) cannot be
characterized by associated sets:
(Bruckner [14, 1967,]),
(B. Cristian, I. Tevy [19, 1980,]),
(Kellum [76, 1982,]),
(Rosen [115, 1996,]) and the remaining classes from Chart 2
(Ciesielski, Natkaniec [39, 1997,]).
The question about topologizing different classes of real functions has been
first systematically studied in early 1990's by Ciesielski in [26]. He
starts with the following theorem listing basic properties of classes that can
be topologized. In the theorem
stands for the set of complex numbers,
for the class of linear functions f(x)=ax+b,
for the natural topology on , and 
for the
identity function from X to X.
Of all these properties only (iii) needs a little longer
(but still easy) argument. Note also, that (i) shows, that in order to
topologize some family, only the search for the range topology is essential.
Condition (v) shows that the question when topologies
and 
can be chosen equal is answered by the following
corollary.
Next, from Theorem 5.1 (conditions (iii), (vi) and (ix)) Ciesielski concludes the following fact
which easily leads to the following corollary:
(The definitions of all classes of functions from this, and the next corollary can be found in [15] and in [35].)
With a little more effort he also concludes
From the positive side, paper [26] contains the following deeper result.
Applying Theorem 5.6 to the
-ideal 
of the first category subsets of 
, and using the
fact that for any different harmonic functions
we have
we can
conclude that the class of all harmonic functions
can be topologized.
Another -ideal that can be used with Theorem 5.6 is the
ideal 
of at most countable sets. Since for any two different
analytic functions 
we have
, we can also conclude the following
corollary.
Notice also, that if the family in Corollary 5.7 is closed
under the composition and
, then, by Theorem 5.1(v),
. We can write this in the form of next
corollary, where stands for the family of all analytic functions and 
for the family of all polynomials.
The following questions in these subject are open.
The general problem of characterizing classes of functions by preimages of sets (in a sense defined above) has been studied only in two papers: [29] and [39]. In paper [29] Ciesielski proves the following theorem, which generalizes a similar result of Preiss and Tartaglia [113].
Clearly the family
of all derivatives satisfies the above conditions (1)-(3). In
particular, Theorem 5.9 implies the following two corollaries.
Note that by Corollary 5.5 the families and in
Corollary 5.11 cannot be topologies. Also, they cannot be algebras:
The following problems remain open.
The problem of characterizing by preimages of sets families from Chart 2 has been recently addressed by Ciesielski and Natkaniec.
The problem of characterizing a family of functions by images of sets was first
studied by Velleman for the class 
of continuous functions from to
.
Note that a family 
from Theorem 5.14 is just the family of Darboux
functions.
Theorem 5.14(2) has been essentially generalized by Ciesielski, Dikranjan and Watson in [30]. In this paper the authors list a basic properties of classes that can be characterized by images of sets, which is similar in flavor to Theorem 5.1. Then, they prove the following generalization of Theorem 5.14.
They also remarked that there is a compact subset 
, a Cook continuum,
for which 
, and so, it can be characterized by images of sets.
For
the classes of functions from to , their
generalization of Theorem 5.14 appears as
follows.
This, in particular, implies the following corollary.
They
also noticed that the class of Darboux functions can be
characterized by images of sets. (It is defined that way.)
It has been also recently noticed by Ciesielski and Natkaniec [39] that in Theorem 5.15 the clause ``non-measurable'' cannot be replaced by ``without the Baire property.'' More precisely, they proved
Finally,
Ciesielski and Natkaniec [39]
proved that it is impossible to characterize
by images of sets the classes 
, and 
of
functions (from to ) with the Baire
property. They also proved the following theorem.
The following problem in this area remain open.
Another interesting problem (loosely related to real functions, but having the
same flavor that the topologizing question has) concerns the existence of a
topology on a given set
X, often the real line, satisfying the best possible separation axioms, for
which a given ideal (-ideal) of subsets of X consists precisely of
sets that are nowhere dense (or first category) in X. Ciesielski and
Jasinski [31, 1995,] obtained several positive results in this direction
under some additional set-theoretic assumptions. The problem was also
investigated in the papers [114] by Rogowska and [4] by Balcerzak
and Rogowska.
There are also many interesting theorems concerning different classes of
functions 
, where
is equipped with some abstract topology refining of the natural
topology. A survey of some recent results in this direction can be found in the
last issue of the Real Analysis Exchange [64]. The topologies on
that were
most studied in this aspect in recent years are the 
-density
topology (defined in 1982 by Wilczynski [141])
and the deep
-density topologies
(defined in 1986 independently by 
azarow [91], and by
Poreda and Wagner-Bojakowska [112]).
These are category analogues of the density
topology. The survey of the results in this direction can be found
in a monograph of Ciesielski, Larson and Ostaszewski [35].
(In particular, see [32] or [35, Sec. 1.5,]
for some set theoretic results and open problems concerning these topologies.)
