Abstract
LetL be a sublattice of the space of real continuous functions defined on a Suslin spaceX, such that at no point all the functions inL vanish. Then it is shown that every Daniell integrall μ:L → IR is representable by a Radon measurem onX: μ(ϕ)=∫ϕdm ∀ϕ∈L. The measurem may be uniquely determined by constraining it to be concentrated on a certain type of subset ofX. The relation betweenL 1(μ) andL 1(m) is examined in detail.
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