Silver machine - Wikiwand

Preliminaries

An ordinal $\alpha$ is *definable from a class of ordinals X if and only if there is a formula $\phi (\mu _{0},\mu _{1},\ldots ,\mu _{n})$ and ordinals $\beta _{1},\ldots ,\beta _{n},\gamma \in X$ such that $\alpha$ is the unique ordinal for which $\models _{L_{\gamma }}\phi (\alpha ^{\circ },\beta _{1}^{\circ },\ldots ,\beta _{n}^{\circ })$ where for all $\alpha$ we define $\alpha ^{\circ }$ to be the name for $\alpha$ within $L_{\gamma }$ .

A structure $\langle X,<,(h_{i})_{i<\omega }\rangle$ is eligible if and only if:

$X\subseteq On$ .
< is the ordering on On restricted to X.
$\forall i,h_{i}$ is a partial function from $X^{k(i)}$ to X, for some integer k(i).

If $N=\langle X,<,(h_{i})_{i<\omega }\rangle$ is an eligible structure then $N_{\lambda }$ is defined to be as before but with all occurrences of X replaced with $X\cap \lambda$ .

Let $N^{1},N^{2}$ be two eligible structures which have the same function k. Then we say $N^{1}\triangleleft N^{2}$ if $\forall i\in \omega$ and $\forall x_{1},\ldots ,x_{k(i)}\in X^{1}$ we have:

$h_{i}^{1}(x_{1},\ldots ,x_{k(i)})\cong h_{i}^{2}(x_{1},\ldots ,x_{k(i)})$

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Silver machine

A Silver machine is an eligible structure of the form $M=\langle On,<,(h_{i})_{i<\omega }\rangle$ which satisfies the following conditions:

Condensation principle. If $N\triangleleft M_{\lambda }$ then there is an $\alpha$ such that $N\cong M_{\alpha }$ .

Finiteness principle. For each $\lambda$ there is a finite set $H\subseteq \lambda$ such that for any set $A\subseteq \lambda +1$ we have

M_{\lambda +1}[A]\subseteq M_{\lambda }[(A\cap \lambda )\cup H]\cup \{\lambda \}

Skolem property. If $\alpha$ is *definable from the set $X\subseteq On$ , then $\alpha \in M[X]$ ; moreover there is an ordinal $\lambda <[sup(X)\cup \alpha ]^{+}$ , uniformly $\Sigma _{1}$ definable from $X\cup \{\alpha \}$ , such that $\alpha \in M_{\lambda }[X]$ .

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References