Litcius/Paper detail

A non-orthogonal variational quantum eigensolver

William J Huggins, Joonho Lee, Unpil Baek, Bryan O’Gorman, K Birgitta Whaley

2020New Journal of Physics144 citationsDOIOpen Access PDF

Abstract

Variational algorithms for strongly correlated chemical and materials systems are one of the most promising applications of near-term quantum computers. We present an extension to the variational quantum eigensolver that approximates the ground state of a system by solving a generalized eigenvalue problem in a subspace spanned by a collection of parametrized quantum states. This allows for the systematic improvement of a logical wavefunction ansatz without a significant increase in circuit complexity. To minimize the circuit complexity of this approach, we propose a strategy for efficiently measuring the Hamiltonian and overlap matrix elements between states parametrized by circuits that commute with the total particle number operator. This strategy doubles the size of the state preparation circuits but not their depth, while adding a small number of additional two-qubit gates relative to standard variational quantum eigensolver. We also propose a classical Monte Carlo scheme to estimate the uncertainty in the ground state energy caused by a finite number of measurements of the matrix elements. We explain how this Monte Carlo procedure can be extended to adaptively schedule the required measurements, reducing the number of circuit executions necessary for a given accuracy. We apply these ideas to two model strongly correlated systems, a square configuration of H 4 and the -system of hexatriene (C 6 H 8 ).

Topics & Concepts

PhysicsAnsatzHamiltonian (control theory)Wave functionQuantum Monte CarloEigenvalues and eigenvectorsGround stateQuantumSubspace topologyQuantum algorithmQuantum mechanicsVariational Monte CarloStatistical physicsQuantum circuitQuantum computerMonte Carlo methodApplied mathematicsHamiltonian matrixElectronic circuitVariational methodQuantum simulatorMatrix (chemical analysis)Quantum systemHybrid Monte CarloQuantum numberQubitState (computer science)AlgorithmQuantum error correctionDensity matrixQuantum stateTopology (electrical circuits)Quantum operationScheduleQuantum Computing Algorithms and ArchitectureQuantum many-body systemsMachine Learning in Materials Science