Difference between revisions of "User talk:Rkossak"

Revision as of 08:13, 8 January 2013

Suppose $M$ is countable recursively saturated and $X$ is an undefinable subset of $M$ . Is there a countable recursively saturated $N$ such that $N$ is an elementary end extension of $M$ , and if $Y \subseteq M$ is coded in $N$ , then $(M,Y) \not\equiv (M,X)$ ?

The answer is `yes' is either $(M,X)\not\models PA^*$ or ${\rm Th}(M,X)\notin {\rm SSy}(M)$ .

Revision as of 08:11, 8 January 2013 (view source) Rkossak (Talk \| contribs) (Created page with "Suppose $M$ is countable recursively saturated and $X$ is an undefinable subset of $M$ . Is there a countable recursively saturated $N$ such that $N$ is an elementary end exten...")		Revision as of 08:13, 8 January 2013 (view source) Rkossak (Talk \| contribs) Newer edit →
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−	The answer is `yes' is either $(M,X)\not\models~~\SPA~~ $or$ \Th(M,X)\notin\SSy(M)$.	+	The answer is `yes' is either $(M,X)\not\models PA^* $or$ {\rm Th}(M,X)\notin {\rm SSy}(M)$.

Difference between revisions of "User talk:Rkossak"

Revision as of 08:13, 8 January 2013

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