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arxiv: 1704.01896 · v4 · pith:DEW3Q5WYnew · submitted 2017-04-06 · 📊 stat.ML · cs.LG

On the Statistical Efficiency of Compositional Nonparametric Prediction

classification 📊 stat.ML cs.LG
keywords binarycompositionallabelednonparametricnumberorderproposesamples
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In this paper, we propose a compositional nonparametric method in which a model is expressed as a labeled binary tree of $2k+1$ nodes, where each node is either a summation, a multiplication, or the application of one of the $q$ basis functions to one of the $p$ covariates. We show that in order to recover a labeled binary tree from a given dataset, the sufficient number of samples is $O(k\log(pq)+\log(k!))$, and the necessary number of samples is $\Omega(k\log (pq)-\log(k!))$. We further propose a greedy algorithm for regression in order to validate our theoretical findings through synthetic experiments.

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