Tonelli plane variation
A numerical characteristic of a function of two variables, by means of which one defines the class of functions of bounded variation in the sense of Tonelli. Suppose that 
is a function given on the rectangle 
. Assume that the functions
 |
and
 |
are Lebesgue measurable (the first on the interval 
, the second on 
). If
 |
then one says that the function 
has bounded (finite, or: is of bounded (finite)) Tonelli plane variation on the rectangle 
, and the class of all such functions is denoted by 
. This definition was proposed by L. Tonelli (cf. [1], [2]). For continuous functions, however, another characterization (in terms of the Banach indicatrix) of the class 
can be found in an earlier paper of S. Banach [4]. If the function 
is continuous on the rectangle 
, then the surface 
has finite area if and only if 
belongs to 
(cf. Tonelli theorem).
References
| [1] | L. Tonelli, "Sur la quadrature des surfaces" C.R. Acad. Sci. Paris , 182 (1926) pp. 1198–1200 |
| [2] | L. Tonelli, "Sulla quadratura delle superficie" Atti Accad. Naz. Lincei , 3 (1926) pp. 357–363; 445–450; 633–658 |
| [3] | A.G. Vitushkin, "On higher-dimensional variations" , Moscow (1955) (In Russian) |
| [4] | S. Banach, "Sur les lignes rectifiables et les surfaces dont l'aire est finie" Fund. Math. , 7 (1925) pp. 225–236 |
| [5] | S. Saks, "Theory of the integral" , Hafner (1952) pp. 169 (Translated from French) |
Tonelli plane variation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Tonelli_plane_variation&oldid=16914