Author:
CUMMINGS JAMES,HAYUT YAIR,MAGIDOR MENACHEM,NEEMAN ITAY,SINAPOVA DIMA,UNGER SPENCER
Abstract
AbstractWe present an alternative proof that from large cardinals, we can force the tree property at
$\kappa ^+$
and
$\kappa ^{++}$
simultaneously for a singular strong limit cardinal
$\kappa $
. The advantage of our method is that the proof of the tree property at the double successor is simpler than in the existing literature. This new approach also works to establish the result for
$\kappa =\aleph _{\omega ^2}$
.
Publisher
Cambridge University Press (CUP)