A remark on dimensionality reduction in discrete subgroups
Abstract
In this short note, we prove a version of the Johnson-Lindenstrauss flattening Lemma for point sets taking values in discrete subgroups. More precisely, given d,λ0,N0∈N and ε∈ (0,12) suitably chosen, we show there exists a natural number k=k(d,ε)=O(1ε2 d), such that for every sufficiently large scaling factor λ∈N and any point set D⊂λλ0Zd B(0,λ N0) with cardinality d, there exists an embedding F:D1λ0Zk, with distortion at most (1+ε+ελλ0).
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