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Barren plateaus in quantum tensor network optimization

Enrique Cervero Martín, Kirill Plekhanov, Michael Lubasch

2023Quantum78 citationsDOIOpen Access PDF

Abstract

We analyze the barren plateau phenomenon in the variational optimization of quantum circuits inspired by matrix product states (qMPS), tree tensor networks (qTTN), and the multiscale entanglement renormalization ansatz (qMERA). We consider as the cost function the expectation value of a Hamiltonian that is a sum of local terms. For randomly chosen variational parameters we show that the variance of the cost function gradient decreases exponentially with the distance of a Hamiltonian term from the canonical centre in the quantum tensor network. Therefore, as a function of qubit count, for qMPS most gradient variances decrease exponentially and for qTTN as well as qMERA they decrease polynomially. We also show that the calculation of these gradients is exponentially more efficient on a classical computer than on a quantum computer.

Topics & Concepts

AnsatzHamiltonian (control theory)MathematicsExponential growthRenormalizationQuantum entanglementQuantumQubitQuantum computerQuantum algorithmApplied mathematicsStatistical physicsQuantum mechanicsMathematical physicsPhysicsMathematical analysisMathematical optimizationQuantum Computing Algorithms and ArchitectureQuantum many-body systemsQuantum Information and Cryptography