Almost Optimal Proper Learning and Testing Polynomials

Abstract

We give the first almost optimal polynomial-time proper learning algorithm of Boolean sparse multivariate polynomial under the uniform distribution. For s-sparse polynomial over n variables and ε=1/sβ, β>1, our algorithm makes qU=(sε) ββ+O(1β)+ O(s)(1ε) n queries. Notice that our query complexity is sublinear in 1/ε and almost linear in s. All previous algorithms have query complexity at least quadratic in s and linear in 1/ε. We then prove the almost tight lower bound qL=(sε) ββ+(1β)+ (s)(1ε) n, Applying the reduction in~Bshouty19b with the above algorithm, we give the first almost optimal polynomial-time tester for s-sparse polynomial. Our tester, for β>3.404, makes O(sε) queries.