Basis Adaptive Algorithm for Quantum Many-Body Systems on Quantum Computers
Abstract
A new basis adaptive algorithm for hybrid quantum-classical platforms is introduced to efficiently find the ground-state (gs) properties of quantum many-body systems. The method addresses limitations of many algorithms, such as Variational Quantum Eigensolver (VQE) and Quantum Phase Estimation (QPE) etc by using shallow Trotterized circuits for short real-time evolution on a quantum processor. The sampled basis is then symmetry-filtered by using various symmetries of the Hamiltonian which is then classically diagonalized in the reduced Hilbert space. We benchmark this approach on the spin-1/2 XXZ chain up to 24 qubits using the IBM Heron processor. The algorithm achieves sub-percent accuracy in ground-state energies across various anisotropy regimes. Crucially, it outperforms the Sampling Krylov Quantum Diagonalization (SKQD) method, demonstrating a substantially lower energy error for comparable reduced-space dimensions. This work validates symmetry-filtered, real-time sampling as a robust and efficient path for studying correlated quantum systems on current near-term hardware.
Cite
@article{arxiv.2512.12753,
title = {Basis Adaptive Algorithm for Quantum Many-Body Systems on Quantum Computers},
author = {Anutosh Biswas and Sayan Ghosh and Ritajit Majumdar and Mostafizur Rahaman and Manoranjan Kumar},
journal= {arXiv preprint arXiv:2512.12753},
year = {2025}
}
Comments
7 pages, 4 figures