Semicontinuous function
An extended real-valued function 
, defined on a complete metric space 
, is said to be lower (upper) semi-continuous at a point 
if
 |
The function 
is said to be lower (upper) semi-continuous on 
if it is lower (upper) semi-continuous at all points 
. The limit of a monotone increasing (decreasing) sequence of functions which are lower (upper) semi-continuous at a point 
is again lower (upper) semi-continuous at 
. If 
and 
are, respectively, lower and upper semi-continuous on 
and for all 
it is true that 
, 
, 
, then there exists a continuous function 
on 
such that 
for all 
. If 
is a non-negative regular Borel measure on 
, then for any 
-measurable function 
there exist two monotone sequences of functions 
and 
satisfying the conditions: 1) 
is lower semi-continuous, 
is upper semi-continuous; 2) every 
is bounded below, every 
is bounded above; 3) 
is a decreasing sequence and 
is an increasing sequence; 4) for all 
,
 |
5) 
-almost everywhere,
 |
and 6) if 
is 
-summable over 
, 
, then 
and
 |
(the Vitali–Carathéodory theorem).
References
| [1] | I.P. Natanson, "Theory of functions of a real variable" , 1–2 , F. Ungar (1955–1961) (Translated from Russian) |
| [2] | S. Saks, "Theory of the integral" , Hafner (1937) (Translated from French) |
Comments
The expressions lower semi-continuous and upper semi-continuous are often abbreviated to l.s.c. and u.s.c.. The notions of l.s.c. and u.s.c. function can be defined on any topological space 
. The superior (respectively, inferior) envelope of any family of continuous functions is l.s.c. (u.s.c.), and the converse is true whenever 
is completely regular; this holds with a countable family of continuous functions if 
is metrizable. Consequently, a semi-continuous function on a metric space 
is of Baire class one (cf. Baire classes). The converse is not true.
Let 
. If
 |
then 
is of Baire class one, but neither lower nor upper semi-continuous. Also, 
is lower semi-continuous, but
 |
Note that 
for all 
, so 
is the pointwise limit of an increasing sequence of continuous functions.
A very useful fact on semi-continuous functions is the Dini–Cartan lemma. Let 
be a compact space and 
a family of l.s.c. functions such that for any finite subset 
of 
there is an 
with 
. If 
is an u.s.c. function such that 
, then there is an 
such that 
; in particular, one has 
.
References
| [a1] | K.R. Stromberg, "Introduction to classical real analysis" , Wadsworth (1981) |
Semicontinuous function. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Semicontinuous_function&oldid=27508