Author:
HE JIALIANG,LI ZUOHENG,ZHANG SHUGUO
Abstract
Abstract
We show that Katětov and Rudin–Blass orders on summable tall ideals coincide. We prove that Katětov order on summable tall ideals is Galois–Tukey equivalent to
$(\omega ^\omega ,\le ^*)$
. It follows that Katětov order on summable tall ideals is upwards directed which answers a question of Minami and Sakai. In addition, we prove that
${l_\infty }$
is Borel bireducible to an equivalence relation induced by Katětov order on summable tall ideals.
Publisher
Cambridge University Press (CUP)
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