DOI: 10.1063/5.0333047 ISSN: 0021-9606

Classically driven hybrid quantum algorithms with sequential Givens rotations for reduced measurement cost

Benjamin Mokhtar, Noboru Inoue, Takashi Tsuchimochi

Quantum algorithms for electronic-structure simulations are actively being developed, yet many hybrid quantum–classical approaches are bottlenecked by the measurement overhead associated with large molecular Hamiltonians. Here, we introduce a diagonalization-driven framework that progressively drives the electronic Hamiltonian toward a (block-)diagonal form in the Slater-determinant basis using sequential Givens rotations. In contrast to Schrödinger-picture methods that variationally optimize a wave function, our approach adopts a Heisenberg-picture viewpoint: the Hamiltonian is iteratively transformed, and rotation angles are determined classically from low-dimensional effective blocks, reducing the quantum workload to a small, fixed set of matrix-element measurements per iteration. Candidate generators are estimated via approximate Baker–Campbell–Hausdorff updates with truncation and cumulant-based approximations that control Hamiltonian growth, complemented by stochastic selection to avoid stagnation. We further introduce an angle-merging procedure that reduces circuit depth by consolidating repeated small-angle rotations. We benchmark the framework on N2 and strongly correlated hydrogen systems, assessing convergence behavior, residual-structure diagnostics, measurement–accuracy trade-offs, circuit costs, and robustness under finite sampling.

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