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We introduce a generalized variational quantum eigensolver (VQE) algorithm that bridges quantum phase estimation (QPE) and VQE. This new approach optimizes quantum circuit depth and sample complexity for finding ground state energies.

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Area of Science:

  • Quantum computing
  • Quantum algorithms
  • Computational chemistry

Background:

  • Finding the ground state energy of a Hamiltonian is crucial for quantum simulations.
  • Current methods like Quantum Phase Estimation (QPE) and Variational Quantum Eigensolver (VQE) have distinct resource requirements.
  • QPE offers high precision but requires deep circuits, while VQE uses shallower circuits but needs more samples.

Purpose of the Study:

  • To develop a generalized VQE algorithm that interpolates between QPE and standard VQE.
  • To offer a tunable trade-off between circuit depth and sample complexity for ground state energy estimation.
  • To introduce a novel expectation estimation routine for resource-constrained quantum computations.

Main Methods:

  • Proposal of a generalized VQE algorithm with a parameter α controlling the interpolation.
  • Analysis of the algorithm's performance in terms of circuit depth and sample complexity.
  • Development of a new expectation estimation subroutine for limited quantum resources.

Main Results:

  • The generalized VQE algorithm achieves a tunable complexity of O(1/ε^{2(1-α)}) samples with circuit depth O(1/ε^{α}).
  • This approach offers a flexible balance between the precision (ε) and the computational resources required.
  • A new, efficient expectation estimation routine is presented.

Conclusions:

  • The generalized VQE algorithm provides a more versatile approach to determining ground state energies on quantum computers.
  • The tunable parameter α allows for optimization based on available quantum hardware and desired precision.
  • The developed expectation estimation method has broader applicability in quantum algorithms.