论文标题
在缓慢的最小真实中我
On slow minimal reals I
论文作者
论文摘要
Answering a question of Harrington, we show that there exists a proper forcing notion, which adds a minimal real $η\in \prod_{i<ω} n^*_i$, which is eventually different from any old real in $\prod_{i<ω} n^*_i$, where the sequence $\langle n^*_i \mid i<ω\rangle$ grows慢慢地。
Answering a question of Harrington, we show that there exists a proper forcing notion, which adds a minimal real $η\in \prod_{i<ω} n^*_i$, which is eventually different from any old real in $\prod_{i<ω} n^*_i$, where the sequence $\langle n^*_i \mid i<ω\rangle$ grows slowly.
