Radial projections of rectifiable sets

Published 13 Jan 2011 in math.CA | (1101.2587v2)

Abstract: We show that if no $m$-plane contains almost all of an $m$-rectifiable set $E \subset \R^{n}$, then there exists a single $(m - 1)$-plane $V$ such that the radial projection of $E$ has positive $m$-dimensional measure from every point outside $V$.

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