English

Hierarchical Multigrid Ansatz for Variational Quantum Algorithms

Quantum Physics 2024-07-18 v2 Emerging Technologies

Abstract

Quantum computing is an emerging topic in engineering that promises to enhance supercomputing using fundamental physics. In the near term, the best candidate algorithms for achieving this advantage are variational quantum algorithms (VQAs). We design and numerically evaluate a novel ansatz for VQAs, focusing in particular on the variational quantum eigensolver (VQE). As our ansatz is inspired by classical multigrid hierarchy methods, we call it "multigrid" ansatz. The multigrid ansatz creates a parameterized quantum circuit for a quantum problem on nn qubits by successively building and optimizing circuits for smaller qubit counts j<nj < n, reusing optimized parameter values as initial solutions to next level hierarchy at j+1j+1. We show through numerical simulation that the multigrid ansatz outperforms the standard hardware-efficient ansatz in terms of solution quality for the Laplacian eigensolver as well as for a large class of combinatorial optimization problems with specific examples for MaxCut and Maximum kk-Satisfiability. Our studies establish the multi-grid ansatz as a viable candidate for many VQAs and in particular present a promising alternative to the QAOA approach for combinatorial optimization problems.

Keywords

Cite

@article{arxiv.2312.15048,
  title  = {Hierarchical Multigrid Ansatz for Variational Quantum Algorithms},
  author = {Christo Meriwether Keller and Stephan Eidenbenz and Andreas Bärtschi and Daniel O'Malley and John Golden and Satyajayant Misra},
  journal= {arXiv preprint arXiv:2312.15048},
  year   = {2024}
}

Comments

11 pages, 9 figures

R2 v1 2026-06-28T14:00:24.681Z