Lower Bounds for Sparse Oblivious Subspace Embeddings

Abstract

An oblivious subspace embedding (OSE), characterized by parameters m,n,d,ε,δ, is a random matrix ∈ Rm× n such that for any d-dimensional subspace T⊂eq Rn, [∀ x∈ T, (1-ε)\|x\|2 ≤ \| x\|2≤ (1+ε)\|x\|2] ≥ 1-δ. For ε and δ at most a small constant, we show that any OSE with one nonzero entry in each column must satisfy that m = (d2/(ε2δ)), establishing the optimality of the classical Count-Sketch matrix. When an OSE has 1/(9ε) nonzero entries in each column, we show it must hold that m = (εO(δ) d2), improving on the previous (ε2 d2) lower bound due to Nelson and Nguyen (ICALP 2014).

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