Learning low-degree quantum objects

Abstract

We consider the problem of learning low-degree quantum objects up to -error in 2-distance. We show the following results: (i) unknown n-qubit degree-d (in the Pauli basis) quantum channels and unitaries can be learned using O(1/d) queries (independent of n), (ii) polynomials p:\-1,1\n→ [-1,1] arising from d-query quantum algorithms can be classically learned from O((1/)d· n) many random examples (x,p(x)) (which implies learnability even for d=O( n)), and (iii) degree-d polynomials p:\-1,1\n [-1,1] can be learned through O(1/d) queries to a quantum unitary Up that block-encodes p. Our main technical contributions are new Bohnenblust-Hille inequalities for quantum channels and completely bounded~polynomials.

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