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Darji","submitted_at":"2013-11-21T02:27:44Z","abstract_excerpt":"A set $\\mathcal{A}\\subset C[0,1]$ is \\emph{shy} or \\emph{Haar null } (in the sense of Christensen) if there exists a Borel set $\\mathcal{B}\\subset C[0,1]$ and a Borel probability measure $\\mu$ on $C[0,1]$ such that $\\mathcal{A}\\subset \\mathcal{B}$ and $\\mu\\left(\\mathcal{B}+f\\right) = 0$ for all $f \\in C[0,1]$. The complement of a shy set is called a \\emph{prevalent} set. 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