Dmitry B. Rokhlin
Published 2008-04-14Version 1
Let $C$ be a closed convex cone in a Banach ideal space $X$ on a measurable space with a $\sigma$-finite measure. We prove that conditions $C\cap X_+=\{0\}$ and $C\supset -X_+$ imply the existence of a strictly positive continuous functional on $X$, whose restriction to $C$ is non-positive.
Subspaces of $L_p$ that embed into $L_p(μ)$ with $μ$ finite
The Kreps-Yan theorem for $L^\infty$
The metric projections onto closed convex cones in a Hilbert space
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