Concentration Bounds for Quantum States and Limitations on the QAOA from Polynomial Approximations
Open access
Date
2023Type
- Conference Paper
ETH Bibliography
yes
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Abstract
We prove concentration bounds for the following classes of quantum states: (i) output states of shallow quantum circuits, answering an open question from [15]; (ii) injective matrix product states; (iii) output states of dense Hamiltonian evolution, i.e. states of the form eιH(p) · · · eιH(1) |ψ0 > for any n-qubit product state |ψ0 >, where each H(i) can be any local commuting Hamiltonian satisfying a norm constraint, including dense Hamiltonians with interactions between any qubits. Our proofs use polynomial approximations to show that these states are close to local operators. This implies that the distribution of the Hamming weight of a computational basis measurement (and of other related observables) concentrates. An example of (iii) are the states produced by the quantum approximate optimisation algorithm (QAOA). Using our concentration results for these states, we show that for a random spin model, the QAOA can only succeed with negligible probability even at super-constant level p = o(log log n), assuming a strengthened version of the so-called overlap gap property. This gives the first limitations on the QAOA on dense instances at super-constant level, improving upon the recent result [8]. Show more
Permanent link
https://doi.org/10.3929/ethz-b-000598192Publication status
publishedExternal links
Editor
Book title
14th Innovations in Theoretical Computer Science Conference (ITCS 2023)Journal / series
Leibniz International Proceedings in Informatics (LIPIcs)Volume
Pages / Article No.
Publisher
Schloss Dagstuhl - Leibniz-Zentrum für InformatikEvent
Subject
quantum computing; Polynomial approximation; quantum optimization algorithm; QAOA; overlap gap propertyOrganisational unit
03781 - Renner, Renato / Renner, Renato
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Is new version of: http://hdl.handle.net/20.500.11850/592782
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