An algebraic approach to complexity of data stream computations
Abstract
We consider a basic problem in the general data streaming model, namely, to estimate a vector f ∈ n that is arbitrarily updated (i.e., incremented or decremented) coordinate-wise. The estimate f ∈ n must satisfy f-f∞ εf1 , that is, ∀ i ~(fi - fi ε f1). It is known to have O(ε-1) randomized space upper bound cm:jalgo, (ε-1 (ε n)) space lower bound bkmt:sirocco03 and deterministic space upper bound of (ε-2) bits.The O and notations suppress poly-logarithmic factors in n, ε-1, f∞ and δ-1, where, δ is the error probability (for randomized algorithm). We show that any deterministic algorithm for this problem requires space (ε-2 ( f1)) bits.
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