Categoricity of Theories in $L_{\kappa^* \omega}$, when $\kappa^*$ is a measurable cardinal. Part II

by Shelah. [Sh:472]
Fundamenta Math, 2001
We continue the work of [KlSh:362] and prove that for lambda successor, a lambda-categorical theory T in L_{kappa^*, omega} is mu-categorical for every mu, mu <= lambda which is above the (2^{LS(T)})^+-beth cardinal.


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