Form equivalence class Howard-Rubin Number: 14
Statement: If \(m_0\) is an additive, real valued measure on asubalgebra \(\Cal B_0\) of a Boolean algebra \(\Cal B\) then there existsa measure \(m\) on \(\Cal B\) such that \(m=m_0\) on \(\Cal B_0\) and the rangeof \(m\) is contained in the closure of the range of \(m_0\).Tarski [1930] and Note 147.
Howard-Rubin number: 14 BC
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