Pinned quantum Merlin-Arthur: The power of fixing a few qubits in proofs

Daniel Nagaj, Dominik Hangleiter, Jens Eisert, and Martin Schwarz

Phys. Rev. A 103, 012604 – Published 8 January 2021

Abstract

What could happen if we pinned a single qubit of a system and fixed it in a particular state? First, we show that this leads to difficult static questions about the ground-state properties of local Hamiltonian problems with restricted types of terms. In particular, we show that the pinned commuting and pinned stoquastic Local Hamiltonian problems are quantum-Merlin-Arthur–complete. Second, we investigate pinned dynamics and demonstrate that fixing a single qubit via often repeated measurements results in universal quantum computation with commuting Hamiltonians. Finally, we discuss variants of the ground-state connectivity (GSCON) problem in light of pinning, and show that stoquastic GSCON is quantum-classical Merlin-Arthur–complete.

Received 23 October 2020
Accepted 24 November 2020

DOI:https://doi.org/10.1103/PhysRevA.103.012604

Physics Subject Headings (PhySH)

Quantum algorithms Quantum computation Quantum control Quantum simulation

Computational complexity

Quantum Information, Science & Technology

Authors & Affiliations

Daniel Nagaj ^1,*, Dominik Hangleiter ², Jens Eisert ^2,3, and Martin Schwarz²

¹RCQI, Institute of Physics, Slovak Academy of Sciences, Bratislava, Slovakia
²Dahlem Center for Complex Quantum Systems, Physics Department, Freie Universität Berlin, Berlin, Germany
³Department of Mathematics and Computer Science, Freie Universität Berlin, Berlin, Germany

^*Corresponding author: daniel.nagaj@savba.sk

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Vol. 103, Iss. 1 — January 2021

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