English

Numerical circuit synthesis and compilation for multi-state preparation

Quantum Physics 2023-12-22 v3 Emerging Technologies

Abstract

Near-term quantum computers have significant error rates and short coherence times, so compilation of circuits to be as short as possible is essential. Two types of compilation problems are typically considered: circuits to prepare a given state from a fixed input state, called "state preparation"; and circuits to implement a given unitary operation, for example by "unitary synthesis". In this paper we solve a more general problem: the transformation of a set of mm states to another set of mm states, which we call "multi-state preparation". State preparation and unitary synthesis are special cases; for state preparation, m=1m=1, while for unitary synthesis, mm is the dimension of the full Hilbert space. We generate and optimize circuits for multi-state preparation numerically. In cases where a top-down approach based on matrix decompositions is also possible, our method finds circuits with substantially (up to 40%) fewer two-qubit gates. We discuss possible applications, including efficient preparation of macroscopic superposition ("cat") states and synthesis of quantum channels.

Keywords

Cite

@article{arxiv.2305.01816,
  title  = {Numerical circuit synthesis and compilation for multi-state preparation},
  author = {Aaron Szasz and Ed Younis and Wibe de Jong},
  journal= {arXiv preprint arXiv:2305.01816},
  year   = {2023}
}

Comments

v3: fixed two references; v2: Added to discussion in Sections IIA and VIB; v1: 10 pages, 2 figures

R2 v1 2026-06-28T10:24:02.950Z