Page:Russell, Whitehead - Principia Mathematica, vol. I, 1910.djvu/104

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82

INTRODUCTION

[CHAP.

which, again, is equivalent to

$\scriptstyle {(\exists \chi ):\phi x.\equiv _{x}.\chi !x:\psi x.\equiv _{x}.\chi !x}$ ,

which, in virtue of the axiom of reducibility, is equivalent to

$\scriptstyle {\phi x.\equiv _{x}.\psi x}$ .

Thus our definition of the use of $\scriptstyle {{\hat {z}}(\phi z)}$ is such as to satisfy the conditions (2) and (3) which we laid down for classes, i.e. we have

$\scriptstyle {\vdash :.{\hat {z}}(\phi z)={\hat {z}}(\psi z).\equiv :\phi x.\equiv _{x}.\psi x}$ .

Before considering classes of classes, it will be well to define membership of a class, i.e. to define the symbol " $\scriptstyle {x\in {\hat {z}}(\phi z)}$ ," which may be read " $\scriptstyle {x}$ is a member of the class determined by $\scriptstyle {\phi {\hat {z}}}$ ." Since this is a function of the form $\scriptstyle {f\{{\hat {z}}(\phi z)\}}$ , it must be derived, by means of our general definition of such functions, from the corresponding function $\scriptstyle {f\{\phi !{\hat {z}}\}}$ . We therefore put

$\scriptstyle {x\in \psi !{\hat {z}}.=.\psi !x\quad {\text{Df.}}}$

This definition is only needed in order to give a meaning to " $\scriptstyle {x\in {\hat {z}}(\phi z)}$ "; the meaning it gives is, in virtue of the definition of $\scriptstyle {f\{{\hat {z}}(\phi z)\}}$ ,

$\scriptstyle {(\exists \psi ):\phi y.\equiv _{y}.\psi !y:\psi !x}$ .

It thus appears that " $\scriptstyle {x\in {\hat {z}}(\phi z)}$ " implies $\scriptstyle {\phi x}$ , since it implies $\scriptstyle {\psi !x}$ , and $\scriptstyle {\psi !x}$ is equivalent to $\scriptstyle {\phi x}$ ; also, in virtue of the axiom of reducibility, $\scriptstyle {\phi x}$ implies " $\scriptstyle {x\in {\hat {z}}(\phi z)}$ ," since there is a predicative function $\scriptstyle {\psi }$ formally equivalent to $\scriptstyle {\phi }$ , and $\scriptstyle {x}$ must satisfy $\scriptstyle {\psi }$ , since $\scriptstyle {x}$ (ex hypothesi) satisfies $\scriptstyle {\phi }$ . Thus in virtue of the axiom of reducibility we have

$\scriptstyle {\vdash :x\in {\hat {z}}(\phi z).\equiv .\phi x}$ ,

i.e. $\scriptstyle {x}$ is a member of the class $\scriptstyle {{\hat {z}}(\phi z)}$ when, and only when, $\scriptstyle {x}$ satisfies the function $\scriptstyle {\phi }$ which defines the class. We have next to consider how to interpret a class of classes. As we have defined $\scriptstyle {f\{{\hat {z}}(\phi z)\}}$ , we shall naturally regard a class of classes as consisting of those values of $\scriptstyle {{\hat {z}}(\phi z)}$ which satisfy $\scriptstyle {f\{{\hat {z}}(\phi z)\}}$ . Let us write $\scriptstyle {\alpha }$ for $\scriptstyle {{\hat {z}}(\phi z)}$ ; then we may write $\scriptstyle {{\hat {\alpha }}(f\alpha )}$ for the class of values of $\scriptstyle {\alpha }$ which satisfy $\scriptstyle {f\alpha }$ ^[1]. We shall apply the same definition, and put

$\scriptstyle {F\{{\hat {\alpha }}(f\alpha )\}.=:(\exists g):f\beta .\equiv _{\beta }.g!\beta :F\{g!{\hat {\alpha }}\}\quad {\text{Df}}}$ ,

where " $\scriptstyle {\beta }$ " stands for any expression of the form $\scriptstyle {{\hat {z}}(\psi !z)}$ . Let us take " $\scriptstyle {\gamma \in {\hat {\alpha }}(f\alpha )}$ " as an instance of $\scriptstyle {F\{{\hat {\alpha }}(f\alpha )\}}$ . Then

$\scriptstyle {\vdash :.\gamma \in {\hat {\alpha }}(f\alpha ).\equiv :(\exists g):f\beta .\equiv _{\beta }.g!\beta :\gamma \in g!{\hat {\alpha }}}$ .

Just as we put

$\scriptstyle {x\in \psi !{\hat {z}}.=.\psi !x\quad {\text{Df}}}$ ,

so we put

$\scriptstyle {\gamma \in g!{\hat {\alpha }}.=.g!\gamma \quad {\text{Df.}}}$

Thus we find

$\scriptstyle {\vdash :.\gamma \in {\hat {\alpha }}(f\alpha ).\equiv :(\exists g):f\beta .\equiv _{\beta }.g!\beta :g!\gamma }$ .

↑ The use of a single letter, such as $\scriptstyle {\alpha }$ or $\scriptstyle {\beta }$ , to represent a variable class, will be further explained shortly.

[1] The use of a single letter, such as $\scriptstyle {\alpha }$ or $\scriptstyle {\beta }$ , to represent a variable class, will be further explained shortly.

[1]