Page:Cantortransfinite.djvu/117

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98

THE FOUNDING OF THE THEORY

will be built, afford also the most natural, shortest, and most rigorous foundation for the theory of finite numbers.

To a single thing $e_{0}$ , if we subsume it under the concept of an aggregate $E_{0}=(e_{o})$ , corresponds as cardinal number what we call "one" and denote by 1; we have

(1)

1={\overline {\overline {E_{0}}}}

.

Let us now unite with $E_{0}$ another thing $e_{1}$ and call the union-aggregate $e_{1}$ , so that

(2)

E_{1}=(E_{0},e_{1})=(e_{0},e_{1})

.

The cardinal number of $E_{1}$ is called "two" and is denoted by 2:

(3)

2={\overline {\overline {E_{1}}}}

.

By addition of new elements we get the series of aggregates

$E_{2}=(E_{1},e_{2}),\quad E_{3}=(E_{2},e_{3}),...$ ,

which give us successively, in unlimited sequence, the other so-called "finite cardinal numbers" denoted by $3$ , $4$ , $5$ , ... The use which we here make of these numbers as suffixes is justified by the fact that a number is only used as a suffix when it has been defined as a cardinal number. We have, if by $\nu -1$ is understood the number immediately preceding $\nu$ in the above series,

(4)

\nu ={\overline {\overline {E_{\nu -1}}}}

,

(5)

E_{\nu }=(E_{\nu -1},e_{\nu })=(e_{0},e_{1},...e_{v})

.