# Article

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Keywords:
ordered locally convex space; order convergence; marginals
Summary:
Suppose $E$ is an ordered locally convex space, $X_{1}$ and $X_{2}$ Hausdorff completely regular spaces and $Q$ a uniformly bounded, convex and closed subset of $M_{t}^{+}(X_{1} \times X_{2}, E)$. For $i=1,2$, let $\mu _{i} \in M_{t}^{+}(X_{i}, E)$. Then, under some topological and order conditions on $E$, necessary and sufficient conditions are established for the existence of an element in $Q$, having marginals $\mu _{1}$ and $\mu _{2}$.
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