Tonelli theorem

on the finiteness of the area of a continuous surface given by an explicit equation

Suppose that is a real-valued function defined on a rectangle ; then

a) the continuous surface , , has finite area if and only if has finite Tonelli plane variation on ;

b) if the assertion in a) holds, then

where the area

is a continuous additive function of rectangles , and for almost-every point one has the equation

c) the equation holds if and only if the function is absolutely continuous on , and this holds if and only if the area is an absolutely-continuous function of rectangles .

This theorem was proved by L. Tonelli (cf. [1]–[3], and also [4]), although assertion a) for all surfaces defined parametrically was established by S. Banach [5] (in a somewhat different terminology).

References

Comments

The surface is said to be continuous if is continuous; the area is the Lebesgue area (see Area), i.e. roughly speaking the liminf of the values of the areas of the polyhedra inscribed in the surface when these polyhedra uniformly tend to the surface. The definition of (a surface integral) makes sense if the partial derivatives are defined almost-everywhere; this is the case whenever is absolutely continuous. Tonelli's theorem is the culmination of the 19th century style attempts to grasp the concept of area as it had been done for the concept of length. For modern work in this field see Area.