English

Optimal compilation of parametrised quantum circuits

Quantum Physics 2025-08-27 v5

Abstract

Parametrised quantum circuits contain phase gates whose phase is determined by a classical algorithm prior to running the circuit on a quantum device. Such circuits are used in variational algorithms like QAOA and VQE. In order for these algorithms to be as efficient as possible it is important that we use the fewest number of parameters. We show that, while the general problem of minimising the number of parameters is NP-hard, when we restrict to circuits that are Clifford apart from parametrised phase gates and where each parameter is used just once, we *can* efficiently find the optimal parameter count. We show that when parameter transformations are required to be sufficiently well-behaved, the only rewrites that reduce parameters correspond to simple 'fusions'. Using this we find that a previous circuit optimisation strategy by some of the authors [Kissinger, van de Wetering. PRA (2019)] finds the optimal number of parameters. Our proof uses the ZX-calculus. We also prove that the standard rewrite rules of the ZX-calculus suffice to prove any equality between parametrised Clifford circuits.

Keywords

Cite

@article{arxiv.2401.12877,
  title  = {Optimal compilation of parametrised quantum circuits},
  author = {John van de Wetering and Richie Yeung and Tuomas Laakkonen and Aleks Kissinger},
  journal= {arXiv preprint arXiv:2401.12877},
  year   = {2025}
}

Comments

V2, V3: Added 6 pages of more proof details. In particular the main result now proves optimality and not just minimality of the parameter count

R2 v1 2026-06-28T14:24:54.161Z