Reduced Label Complexity For Tight 2 Regression
Abstract
Given data X∈Rn× d and labels y∈Rn the goal is find w∈Rd to minimize Xw-y2. We give a polynomial algorithm that, oblivious to y, throws out n/(d+n) data points and is a (1+d/n)-approximation to optimal in expectation. The motivation is tight approximation with reduced label complexity (number of labels revealed). We reduce label complexity by (n). Open question: Can label complexity be reduced by (n) with tight (1+d/n)-approximation?
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