Bouligand Dimension and Almost Lipschitz Embeddings
نویسندگان
چکیده
In this paper we present some new properties of the metric dimension defined by Bouligand in 1928 and prove the following new projection theorem: Let dimb(A − A) denote the Bouligand dimension of the set A − A of differences between elements of A. Given any compact set A ⊆ R such that dimb(A−A) < m, then almost every orthogonal projection P of A of rank m is injective on A and P |A has Lipschitz continuous inverse except for a logarithmic correction term.
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