Stochastic noise can be helpful for variational quantum algorithms
- 1. University of Chicago
- 2. Freie Universität Berlin
- 3. University of Pittsburgh
Description
Saddle points constitute a crucial challenge for first-order gradient descent algorithms. In notions of classical machine learning, they are avoided, for example, by means of stochastic gradient descent methods. In this work, we provide evidence that the saddle-points problem can be naturally avoided in variational quantum algorithms by exploiting the presence of stochasticity. We prove convergence guarantees and present practical examples in numerical simulations and on quantum hardware. We argue that the natural stochasticity of variational algorithms can be beneficial for avoiding strict saddle points, i.e., those saddle points with at least one negative Hessian eigenvalue. This insight that some levels of shot noise could help is expected to add a new perspective to notions of near-term variational quantum algorithms.
Additional details
Identifiers
- DOI
- 10.1103/physreva.111.052441
- Other
- oai:uchicago.tind.io:16221
Funding
- International Business Machines Corporation
- University of Chicago
- Air Force Office of Scientific Research
- FA9550-21-1-0209
- University of Pittsburgh
- National Aeronautics and Space Administration
- 80NSSC25M7057
- Bundesministerium für Bildung und Forschung
- Bundesministerium für Wirtschaft und Klimaschutz
- Einstein Stiftung Berlin
- Deutsche Forschungsgemeinschaft
- European Research Council
- Army Research Office
- W911NF-18-1-0020
- U.S. Department of Energy
- DE-AC05-00OR22725
- National Science Foundation
- EFMA-1640959
- David and Lucile Packard Foundation
- 2013-39273
- Air Force Office of Scientific Research
- FA9550-19-1-0399
- National Science Foundation
- OMA-1936118
- National Science Foundation
- EEC-1941583
- Army Research Office
- W911NF-18-1-0212
- Army Research Office
- W911NF-16-1-0349