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    Learning sparse polynomial functions

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    Abstract We study the question of learning a sparse multivariate polynomial over the real domain. In particular, for some unknown polynomial f ( x) of degree-d and k monomials, we show how to reconstruct f , within erro

    Learning using Local Membership Queries

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    We introduce a new model of membership query (MQ) learning, where the learning algorithm is restricted to query points that are \emph{close} to random examples drawn from the underlying distribution. The learning model is intermediate between the PAC model (Valiant, 1984) and the PAC+MQ model (where the queries are allowed to be arbitrary points). Membership query algorithms are not popular among machine learning practitioners. Apart from the obvious difficulty of adaptively querying labelers, it has also been observed that querying \emph{unnatural} points leads to increased noise from human labelers (Lang and Baum, 1992). This motivates our study of learning algorithms that make queries that are close to examples generated from the data distribution. We restrict our attention to functions defined on the nn-dimensional Boolean hypercube and say that a membership query is local if its Hamming distance from some example in the (random) training data is at most O(log(n))O(\log(n)). We show the following results in this model: (i) The class of sparse polynomials (with coefficients in R) over {0,1}n\{0,1\}^n is polynomial time learnable under a large class of \emph{locally smooth} distributions using O(log(n))O(\log(n))-local queries. This class also includes the class of O(log(n))O(\log(n))-depth decision trees. (ii) The class of polynomial-sized decision trees is polynomial time learnable under product distributions using O(log(n))O(\log(n))-local queries. (iii) The class of polynomial size DNF formulas is learnable under the uniform distribution using O(log(n))O(\log(n))-local queries in time nO(log(log(n)))n^{O(\log(\log(n)))}. (iv) In addition we prove a number of results relating the proposed model to the traditional PAC model and the PAC+MQ model
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