A simpler Gaussian state-preparation
Quantum Physics
2025-08-07 v1
Abstract
The ability to efficiently state-prepare Gaussian distributions is critical to the success of numerous quantum algorithms. The most popular algorithm for this subroutine (Kitaev-Webb) has favorable polynomial resource scaling, however it faces enormous resource overheads making it functionally impractical. In this paper, we present a new, more intuitive method which uses exactly rotations, two-qubit controlled rotations, and ancilla to state-prepare an -qubit Gaussian state. We then apply optimizations to the circuit to render it linear in T-depth. This method can be extended to state-preparations of complex functions with polynomial phase.
Cite
@article{arxiv.2508.03987,
title = {A simpler Gaussian state-preparation},
author = {Parker Kuklinski and Benjamin Rempfer and Kevin Obenland and Justin Elenewski},
journal= {arXiv preprint arXiv:2508.03987},
year = {2025}
}