Form Classes

Form equivalence class Howard-Rubin Number: 97

Statement:

For every set \(\{X_i: i\in I\}\) of local cardinal numbers, there is a set \(\{x_i: i\in I\}\) of sets such that for each \(i\in I\) there exists a \(y_i\in X_i\) such that \(x_i\approx y_i\). (\(X\) is a local cardinal number if for all \(x, y\in X\), \(x\approx y\).)

Howard-Rubin number: 97 A

Citations (articles): Higasikawa [1995] Partition principles and infinite sums of cardinal numbers

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