English

ZX-calculus for the working quantum computer scientist

Quantum Physics 2020-12-29 v1

Abstract

The ZX-calculus is a graphical language for reasoning about quantum computation that has recently seen an increased usage in a variety of areas such as quantum circuit optimisation, surface codes and lattice surgery, measurement-based quantum computation, and quantum foundations. The first half of this review gives a gentle introduction to the ZX-calculus suitable for those familiar with the basics of quantum computing. The aim here is to make the reader comfortable enough with the ZX-calculus that they could use it in their daily work for small computations on quantum circuits and states. The latter sections give a condensed overview of the literature on the ZX-calculus. We discuss Clifford computation and graphically prove the Gottesman-Knill theorem, we discuss a recently introduced extension of the ZX-calculus that allows for convenient reasoning about Toffoli gates, and we discuss the recent completeness theorems for the ZX-calculus that show that, in principle, all reasoning about quantum computation can be done using ZX-diagrams. Additionally, we discuss the categorical and algebraic origins of the ZX-calculus and we discuss several extensions of the language which can represent mixed states, measurement, classical control and higher-dimensional qudits.

Keywords

Cite

@article{arxiv.2012.13966,
  title  = {ZX-calculus for the working quantum computer scientist},
  author = {John van de Wetering},
  journal= {arXiv preprint arXiv:2012.13966},
  year   = {2020}
}

Comments

About 75 pages of text + 8 pages of appendices

R2 v1 2026-06-23T21:27:36.602Z