Talk:Code (set theory)

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A definition easier to follow

Latest comment: 15 years ago1 comment1 person in discussion

There is probably nothing wrong in the article as it stands, but I want to change the beginning of it anyway. The reason is that I don't like when (for most people) nontrivial concepts are introduced in a single sentence and, in addition, the notation is introduced in nested "where-clauses" and "such-that-clauses"

I'll replace

In set theory, a code for a set

x ${\displaystyle \in H_{\aleph _{1}},}$ 

the notation standing for the hereditarily countable sets,

is a set

E ${\displaystyle \subset }$  ω×ω

such that there is an isomorphism between (ω,E) and (X,${\displaystyle \in }$ ) where X is the transitive closure of {x}.

with this

In set theory a code of a set is defined as follows. Let ${\displaystyle x}$  be a hereditarily countable set, and let ${\displaystyle X}$  be the transitive closure of ${\displaystyle \{x\}}$ . Let as usual ${\displaystyle \omega }$  denote the set of natural numbers and let ${\displaystyle \aleph _{1}}$  be the first uncountable cardinal number. In this notation we have ${\displaystyle x\in H_{\aleph _{1}}}$ . Also recall that ${\displaystyle (X,\in )}$  denotes the relation of belonging in ${\displaystyle X}$ .

A code for ${\displaystyle x}$  is any set ${\displaystyle E}$  satisfying the following two properties:

1.) ${\displaystyle E}$  ${\displaystyle \subset }$  ω×ω

2.) There is an isomorphism between ${\displaystyle (\omega ,E)}$  and ${\displaystyle (X,\in )}$ .

if there are no objections.

YohanN7 (talk) 23:13, 6 June 2008 (UTC)Reply