Bounds on Eventually Universal Quantum Gate Sets

Abstract

Say a collection of n-qudit gates is eventually universal if and only if there exists N0 ≥ n such that for all N ≥ N0, one can approximate any N-qudit unitary to arbitrary precision by a circuit over . In this work, we improve the best known upper bound on the smallest N0 with the above property. Our new bound is roughly d4n, where d is the local dimension (the `d' in qudit), whereas the previous bound was roughly d8n. For qubits (d = 2), our result implies that if an n-qubit gate set is eventually universal, then it will exhibit universality when acting on a 16n qubit system, as opposed to the previous bound of a 256n qubit system. In other words, if adding just 15n ancillary qubits to a quantum system (as opposed to the previous bound of 255 n ancillary qubits) does not boost a gate set to universality, then no number of ancillary qubits ever will. Our proof relies on the invariants of finite linear groups as well as a classification result for all finite groups that are unitary 2-designs.

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