Cardinal collapsing and product forcing
Abstract: Suppose $\kappa$ is a singular strong limit cardinal of countable cofinality and let $\langle \kappa_{n}: n<\omega \rangle$ be an incrasing sequence of regular cardinals cofinal in $\kappa$. We show that if $cf(2\kappa)= \kappa+$, then forcing with the full product $\prod_{n<\omega}Add(\kappa_n,1)$ collapses $2\kappa$ into $\kappa+$. This result gives a consistent positive answer to a question of Sy Friedman. We also give a new proof of a result due to Shelah by showing that if the sequence carries a scale of length $\kappa+,$ then forcing with $\prod_{n<\omega}Add(\kappa_n,1)$ adds a generic filter for $Add(\kappa+, 1)$, and indeed [ \prod_{n<\omega}Add(\kappa_n,1)/fin \simeq Add(\kappa+, 1). ]
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