Form equivalence class Howard-Rubin Number: 52
Statement: Real Valued Convex Domination Theorem: For every realvector space \(X\), every subspace \(X_0\subseteq X\), every linear\(\lambda_0 :X_0\to {\Bbb R}\) and every convex \(p: X\to {\Bbb R}\), if\(\lambda_0 \le p\) on \(X_0\) then \(\lambda_0\) can be extended to a linearmap \(\lambda: X\to {\Bbb R} \) such that \(\lambda \le p\) on \(X\).Schechter [1996b] and Note 31.
Howard-Rubin number: 52 I
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