All Questions
5 questions
0
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Is there a clear inconsistency with this general assertion about n-internalizations of external bijections?
Define: $j^1[x]= j(x) \\ j^{n+1}[x] = \{j^n[y]: y \in x\} \\ j^{-n}[x] = \{y : j^n[y] \in x\}$
Define:
$n=1,2,3,...\\ _n\mathsf{Forth}_j(S)=\{j^n[x] : x \in S\} \\ _n\mathsf{Back}_j(S)=\{j^{-n}[x] : ...
15
votes
4
answers
2k
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Where is the end of universe?
In some sense the empty set ($\emptyset$) and the global set of all sets ($G$) are the ends of the universe of mathematical objects. The world which $ZFC$ describes has an end from the bottom and is ...
0
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1
answer
598
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Can Godel's incompleteness theorems be in some sense circumvented this way?
New foundations "NF" (formulated in the language of $\small \sf FOL(\in)$), can define a kind of ordered pair relation $``\rho"$ such that we can have a set $E$ of those pairs where NF proves the ...
1
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0
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257
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Is there a non-trivial consistency preserving transformation?
In set theory "equiconsistency" (and not "consistency") of the theories is the main part of researches. So we usually try to construct a new model using a given one. In the ...
10
votes
2
answers
737
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Constructible models of New Foundations?
Hi all! Is there anything like Gödel's constructible universe for New Foundations?
More precisely, I would like a process for taking a model $M$ of NF, and using it to build a model $L \subseteq M$ ...