Min-increasing trajectory: Difference between revisions

Latest revision as of 19:49, 18 May 2008

This article defines a property that can be evaluated for a trajectory on the space of functions on a manifold

Let $M$ be a manifold and $u = u (t, x)$ be a function $R \times M \to R$ , where:

In other words, $u$ is a trajectory (or path) in the space of all functions from $M$ to $R$ .

Then, $u$ is said to be min-increasing if the function:

$t \mapsto {inf}_{x \in M} u (t, x)$

is a monotone increasing function. (the function defined above is called the timewise-min function for $u$ ).

The corresponding notion is of a max-decreasing trajectory -- viz a trajectory where the maximum (or supremum) keeps decreasing.

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+{{trajectory property}}
 ==Definition==
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 In other words, <math>u</math> is a trajectory (or path) in the space of all functions from <math>M</math> to <math>\R</math>.
-Then, <math>u</math> is said to be '''max-reducing''' if the function:
+Then, <math>u</math> is said to be '''min-increasing''' if the function:
-<math>t \mapsto \sup_{x \in M} u(t,x)</math>
+<math>t \mapsto \inf_{x \in M} u(t,x)</math>
-is a monotone decreasing function.
+is a monotone increasing function. (the function defined above is called the [[timewise-min function]] for <math>u</math>).
-The corresponding notion is of a '''min-increasing trajectory''' -- viz a trajectory where the minimum (or infimum) keeps increasing.
+The corresponding notion is of a '''max-decreasing trajectory''' -- viz a trajectory where the maximum (or supremum) keeps decreasing.