Accuracy and resource advantages of quantum eigenvalue estimation with non-Hermitian transcorrelated electronic Hamiltonians

Abstract

In electronic structure calculations, the transcorrelated method enables a reduction of the basis set size by incorporating the electron-electron correlations directly into the Hamiltonian. However, the transcorrelated Hamiltonian is non-Hermitian, which makes many common quantum algorithms inapplicable. Recently, a quantum eigenvalue estimation algorithm was proposed for non-Hermitian Hamiltonians with real spectra [FOCS 65, 1051 (2024)]. Here we investigate the cost of this algorithm applied to transcorrelated electronic Hamiltonians of second-row atoms and compare it to the cost of applying standard qubitization to non-transcorrelated Hamiltonians. We find that the ground state energy of the transcorrelated Hamiltonian in the STO-6G basis is more accurate than that of a standard Hamiltonian in the cc-pVQZ basis. The T gate counts of the two methods are comparable, while the qubit count of the transcorrelated method is 2.5 times smaller.