Tag Archives: Uniformization

Given a subset of a regular uncountable cardinal $S\subseteq \kappa$, $U{P}_S$ (read: “the uniformization property holds for $S$”) asserts that for every sequence $\overrightarrow{f}=⟨f_{\alpha }\mid \alpha \in S⟩$ satisfying for all $\alpha \in S$: $f_{\alpha }$ is a 2-valued function; $\text{dom}(f_{\alpha })$ is a … Continue reading →

Given a subset of a regular uncountable cardinal $S\subseteq \kappa$, $U{P}_S$ (read: “the uniformization property holds for $S$”) asserts that for every sequence $\overrightarrow{f}=⟨f_{\alpha }\mid \alpha \in S⟩$ satisfying for all $\alpha \in S$: $f_{\alpha }$ is a 2-valued function; $\text{dom}(f_{\alpha })$ is a … Continue reading →