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Published online by Cambridge University Press: 20 November 2018
In [6] J. Rainwater obtained the following theorem.
Theorem. Let N be a normed linear space, {xn} a bounded sequence of elements in N and X ∊ N. 
for each extreme point f of the unit ball of N✶, then {xn} converges weakly to x.
Now let X be a compact Hausdorff space and H a linear subspace of C(X) (all real-valued continuous functions on X ) which separates the points of X and contains the constant functions. If x∊X, then MX(H) denotes the set of positive linear functionals μ on C(X) such that μ(h) = h(x) for all h in H.
This research was supported in part by NSF Grant GP 4413.
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