Form equivalence class Howard-Rubin Number: 52
Statement: Let \(\cal B_0\) be a subalgebra of a Boolean algebra\(\cal B\) and \(m_0\) an additive, real valued measure on \(\cal B_0\).Then there is a real valued, additive measure \(m\) on \(\cal B\) such that\(m = m_0\) on \(\cal B_0\) and the range of \(m\) is contained in the closedconvex hull of the range of \(m_0\). Luxemburg [1969] and Note 147.
Howard-Rubin number: 52 D
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