Double integral
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In mathematical analysis, there is an important distinction between a double integral and an iterated integral. To one who has had an advanced calculus course but not a measure-theoretic real analysis course, the difference may seem subtle.
Definitions
A double integral
- [\iint_ f(x,y)\,d(x,y)]
On the other hand, if we define
- [g(y)=\int_a^b f(x,y)\,dx]
- [I=\int_c^d g(y)\,dy=\int_c^d\int_a^b f(x,y)\,dx\,dy]
Counterexample
Does it matter whether one integrates first with respect to x and then with respect to y or vice-versa?
Perhaps surprisingly, in some cases yes, as an example shows:
- [\int_0^1\int_0^1\frac\,dx\,dy.]
Explanation via Lebesgue theory
To give the analytic explanation: the double integral exists only if
- [\iint_ \left|f(x,y)\right|\,d(x,y)<\infty,]
In the positive sense
One can give a further explanation, however from the other direction, based on the special role of functions f(x)g(y).
These, in which the roles of the two variables are uncoupled, present no problem in this context; and neither do their linear combinations. Quite generally, given compact spaces X and Y, we can use the Stone-Weierstrass theorem to show that such functions give a subalgebra of C(X×Y) that is dense in the uniform norm: or in other words any continuous function on X×Y can be uniformly approximated by sums of functions f(x)g(y).
This implies that double integrals behave rather well, at least on a large collection of 'test' functions.
See also
External links
- [Double integral] from Mathworld
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