# Does a generic normal measure extend the club filter?

This question is related to this one. The setup is as follows:

In $V$, $\kappa$ is supercompact and $\mathbb{P} = \mathrm{Coll}(\kappa, \aleph_2)$ is the Levy collapse. $G$ is $(V,P)$-generic, and in $V[G]$, $C \subset P_{\kappa}(\lambda)$ is club. Let $j : V \to M$ be an embedding witnessing $\lambda$-supercompactness of $\kappa$. Lift this embedding to $j^{\ast} : V[G] \to M[G \times H]$ where we may assume $H$ is generic over $V[G]$ for the poset $\mathrm{Coll}^{V[G]}(j(\kappa), \aleph_2)$ (note $\aleph_2 ^{V[G]} = \kappa$). Now in $V[G \times H]$ we define $U \subset P_{\kappa}^{V[G]}(\lambda)$ by:

$x \in U$ iff $j[\lambda] \in j^{\ast}(x)$.

This $U$ belongs to $V[G \times H]$, but $V[G]$ "would" think its a normal measure on $P_{\kappa}^{V[G]}(\lambda)$, i.e. it's $\kappa$-complete if we restrict to $<\kappa$-sequences in $V[G]$ and it's normal if we restrict to regressive functions $f : P_{\kappa}^{V[G]}(\lambda) \to \lambda$ where $f \in V[G]$. My question:

Does $U$ also extend the club filter, if we restrict to clubs in $V[G]$?

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By $\text{Coll}(\kappa, \aleph_2)$, you don't mean the set of partial functions from $\aleph_2$ into $\kappa$ having size at most $\aleph_1$, do you? In this case, $U$ will not contain any subsets of $(P_{\omega_2}(\lambda))^{V[G]}$ because $j''\lambda$ will be too big. Since I would refer to that poset as $\text{Coll}(\aleph_2, \kappa)$, I'm thinking maybe you mean an Easton product $\prod_{\alpha < \kappa} \text{Coll}(\aleph_1, \alpha)$. Is this interpretation correct? –  Jason Apr 29 '11 at 7:01
@Jason, I meant the Levy collapse, where each condition is a set of functions of the form $p = \{ f_{\alpha} : \alpha \in S_p\}$ where $S_p$ is a countable subset of $\kappa$ and each $f_{\alpha}$ is a countable partial function from $\omega_1$ to $\alpha$. –  Amit Kumar Gupta Apr 29 '11 at 15:28
@Amit: OK, so it's what I've seen as $\text{Coll}(\aleph_1, {<}\kappa)$. Thanks. –  Jason Apr 30 '11 at 3:11

With the help of Jason's answer to the question I linked to, I think I might be able to solve this one. The key is to show that $P_{\kappa}^{V[G]}(\lambda) \in M[G\times H]$. Let's simply denote this set by $X$. An element $x$ of $X$ can be regarded as a function $x : \omega_1 \to \lambda$, which will be a subset of $\omega_1 \times \lambda$. A nice name for such a subset is a map, in $V$, from $\omega_1 \times \lambda$ to the collection of antichains in $\mathbb{P}$. Since $\mathbb{P}$ has the $\kappa$-chain condition and $\mathbb{P} \in M$, $M$ correctly knows the set of antichains of $\mathbb{P}$. Since $M^{\lambda} \subset M$, $M$ correctly knows the set of nice $(V,\mathbb{P})$-names for subsets of $\omega_1 \times \lambda$, let's call this set $Y$.

Now $\mathbb{P}$ names are $j(\mathbb{P})$ names (since $\mathbb{P} \subset j(\mathbb{P})$), so we get that

$X = \{ \dot{x}^{G\times H}\ |\ \dot{x}^{G\times H} : \omega_1 \to \lambda, \dot{x} \in Y \}$

This is since $\dot{x}^{G \times H} = \dot{x}^G$ for nice $(V,\mathbb{P})$-names. So $X \in M[G \times H]$ as desired.

Recall, we want to show that $U$ extends the club filter, so take $C \in V[G]$ club in $X$. Following the hint in the previous question, we want to show that

• $D = \{j^{\ast}(x)\ |\ x \in C\}$ belongs to $M[G \times H]$
• $D$ has size less than $j(\kappa)$ in $M[G \times H]$, and
• $\bigcup D = j''\lambda$.

Then, since $D$ is a directed subset of $j^{\ast}(C)$, elementarity will give us that $j''\lambda \in j^{\ast}(C)$, as desired.

Since $M^{\lambda} \subset M$, we know that $g := j\upharpoonright \lambda \in M$. So for $x \in X$ (and in particular for $x \in C$), $j^{\ast}(x) = j''x = g''x$. Using this it's not hard to see that $\bigcup D = j''\lambda$. It also implies that

$j^{\ast}$ $''X$ $= \{j^{\ast}(x)\ |\ x \in X\}$ $= \{j''x\ |\ x \in X\} = \{g''x\ |\ x \in X\}$

belongs to $M$. Now if $h : X \to C$ is a surjection in $V[G]$, then $j^{\ast}(h)\upharpoonright j^{\ast}$ $''X$ is belongs to $M[G\times H]$ and its range is $D$, so $D \in M[G\times H]$.

It remains to show $M[G\times H] \vDash |D| < j(\kappa)$. Since $j(\kappa)$ is inaccessible in $M$, there's some bijection $i: \alpha \to Y$ in $M$ for some $\alpha < j(\kappa)$. This gives a surjection $k : \alpha \to X$ in $M[G\times H]$. We can obtain a bijection $l : X \to j^{\ast}$ $''X$ via $l(x) = g''x$. And $j^{\ast}(h)\upharpoonright j^{\ast}$ $''X$ is a surjection onto $D$. So:

$M[G\times H] \vDash |D| \leq |j^{\ast}$ $''X| = |X| \leq \alpha < j(\kappa)$.

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