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2023
Paper (Preprint, Research Paper, Review Paper, White Paper, etc.)
Title
Unleashing Quantum Simulation Advantages: Hamiltonian Subspace Encoding for Resource Efficient Quantum Simulations
Title Supplement
Published on arXiv
Abstract
Number-conserved subspace encoding for fermionic Hamiltonians, which exponentially reduces qubit cost, is necessary for quantum advantages in variational quantum eigensolver (VQE). However, optimizing the trade-off between qubit compression and increased measurement cost poses a challenge. By employing the Gilbert-Varshamov bound on linear code, we optimize qubit scaling O(Nlog2M) and measurement cost O(M4) for M modes N electrons chemistry problems. The compression is implemented with the Randomized Linear Encoding (RLE) algorithm on VQE for H2 and LiH in the 6-31G* and STO-3G/6-31G* basis respectively. The resulting subspace circuit expressivity and trainability are enhanced with less circuit depth and higher noise tolerance.
Author(s)