On a Chang Conjecture. II

Abstract.

Continuing [7], we here prove that the Chang Conjecture \((\aleph_3,\aleph_2) \Rightarrow (\aleph_2,\aleph_1)\) together with the Continuum Hypothesis, \(2^{\aleph_0} = \aleph_1\), implies that there is an inner model in which the Mitchell ordering is \(\geq \kappa^{+\omega}\) for some ordinal \(\kappa\).