Timewise-average function: Difference between revisions

Revision as of 10:59, 8 April 2007

Let $M$ be a differential manifold equipped with a measure over which we can integrate.

Let $u : R \times M \to R$ be any continuous function. Then the timewise-average function of $u$ is a map $f : R \to R$ defined by:

$f (t) = \frac{\int_{M} u (t, x) d x}{\int_{M} d x}$

For instance, the above notion makes sense if we embed the manifold in Euclidena space and look at the induced measure.

@@ Line 5: / Line 5: @@
 Let <math>u:\R \times M \to \R</math> be any continuous function. Then the timewise-average function of <math>u</math> is a map <math>f:\R \to \R</math> defined by:
-<math>f(t) = \frac{\int_M u(t,x) dm}{\int_M dm}</math>
+<math>f(t) = \frac{\int_M u(t,x) dx}{\int_M dx}</math>
 For instance, the above notion makes sense if we embed the manifold in Euclidena space and look at the induced measure.