Orlicz class
The set 
of functions 
which satisfy the condition
 |
where 
is a bounded closed set in 
, 
is the Lebesgue measure, 
is an even convex function (of a real variable) which is increasing for 
positive, and
 |
These functions are called 
-functions. The function 
can be represented as
 |
where 
does not decrease on 
,
 |
and 
when 
. The function 
and
 |
where 
is the inverse function of 
, are called complementary functions. For example, if 
, 
, then 
, where 
. For a pair of complementary functions, the Young inequality
 |
holds.
The function 
is said to satisfy the 
-condition if there exist a 
and an 
such that 
for all 
. An Orlicz class is linear if and only if 
satisfies the 
-condition. The convexity of 
follows from the Jensen inequality.
Let 
and 
be two 
-functions. In order that 
it is necessary and sufficient that 
for a certain 
and sufficiently large 
.
Orlicz classes were examined in [1] by W. Orlicz and Z. Birnbaum.
References
| [1] | Z. Birnbaum, W. Orlicz, "Ueber die Verallgemeinerungen des Begriffes der zueinander konjugierten Potenzen" Studia Math. , 3 (1931) pp. 1–67 |
| [2] | M.A. Krasnosel'skii, Ya.B. Rutitskii, "Convex functions and Orlicz spaces" , Noordhoff (1961) (Translated from Russian) |
Comments
References
| [a1] | W.A.J. Luxemburg, A.C. Zaanen, "Riesz spaces" , I , North-Holland (1971) |
Orlicz class. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Orlicz_class&oldid=18820