Definition:Arbitrarily Small

Definition
Let $P$ be a property of real numbers.

We say that $\map P x$ holds for arbitrarily small $\epsilon$ (or there exist arbitrarily small $x$ such that $\map P x$ holds) :


 * $\forall \epsilon \in \R_{> 0}: \exists x \in \R: \size x \le \epsilon: \map P x$

That is:
 * For any real number $a$, there exists a (real) number not more than $a$ such that the property $P$ holds.

or, more informally and intuitively:
 * However small a number you can think of, there will be an even smaller one for which $P$ still holds.

Also see

 * Definition:Sufficiently Small
 * Definition:Arbitrarily Large