ABSTRACT
We propose an adaptive random quantum algorithm to obtain an optimized eigensolver. Specifically, we introduce a general method to parametrize and optimize the probability density function of a random number generator, which is the core of stochastic algorithms. We follow a bioinspired evolutionary mutation method to introduce changes in the involved matrices. Our optimization is based on two figures of merit: learning speed and learning accuracy. This method provides high fidelities for the searched eigenvectors and faster convergence on the way to quantum advantage with current noisy intermediate-scaled quantum computers.
DETAILS
- Research Type Article
- RESEARCH YEAR 2022
- Journal Name Physical Review A
- Authors N. Barraza, C.-Y. Pan, L. Lamata, E. Solano, and F. Albarrán-Arriagada
- DOI 10.1103/PhysRevA.105.052406