Block encoding with low gate count for second-quantized Hamiltonians
Abstract
Efficient block encoding of many-body Hamiltonians is a central requirement for quantum algorithms in scientific computing, particularly in the early fault-tolerant era. In this work, we introduce new explicit constructions for block encoding second-quantized Hamiltonians that substantially reduce Clifford+T gate complexity and ancilla overhead. By utilizing a data lookup strategy based on the SWAP architecture for the sparsity oracle , and a direct sampling method for the amplitude oracle with SELECT-SWAP architecture, we achieve a T count that scales as with respect to the number of interaction terms in general second-quantized Hamiltonians. We also achieve an improved constant factor in the Clifford gate count of our oracle. Furthermore, we design a block encoding that directly targets the -particle subspace, thereby reducing the subnormalization factor from to , and improving fault-tolerant efficiency when simulating systems with fixed particle numbers. Building on the block encoding framework developed for general many-body Hamiltonians, we extend our approach to electronic Hamiltonians whose coefficient tensors exhibit translation invariance or possess decaying structures. Our results provide a practical path toward early fault-tolerant quantum simulation of many-body systems, substantially lowering resource overheads compared to previous methods.
Cite
@article{arxiv.2510.08644,
title = {Block encoding with low gate count for second-quantized Hamiltonians},
author = {Diyi Liu and Shuchen Zhu and Guang Hao Low and Lin Lin and Chao Yang},
journal= {arXiv preprint arXiv:2510.08644},
year = {2025}
}
Comments
32 pages, 23 figures