English

Fermionic quantum cellular automata and generalized matrix product unitaries

Statistical Mechanics 2021-01-15 v2 Mathematical Physics math.MP Quantum Physics

Abstract

We study matrix product unitary operators (MPUs) for fermionic one-dimensional (1D) chains. In stark contrast with the case of 1D qudit systems, we show that (i) fermionic MPUs do not necessarily feature a strict causal cone and (ii) not all fermionic Quantum Cellular Automata (QCA) can be represented as fermionic MPUs. We then introduce a natural generalization of the latter, obtained by allowing for an additional operator acting on their auxiliary space. We characterize a family of such generalized MPUs that are locality-preserving, and show that, up to appending inert ancillary fermionic degrees of freedom, any representative of this family is a fermionic QCA and viceversa. Finally, we prove an index theorem for generalized MPUs, recovering the recently derived classification of fermionic QCA in one dimension. As a technical tool for our analysis, we also introduce a graded canonical form for fermionic matrix product states, proving its uniqueness up to similarity transformations.

Cite

@article{arxiv.2007.11905,
  title  = {Fermionic quantum cellular automata and generalized matrix product unitaries},
  author = {Lorenzo Piroli and Alex Turzillo and Sujeet K. Shukla and J. Ignacio Cirac},
  journal= {arXiv preprint arXiv:2007.11905},
  year   = {2021}
}

Comments

35 pages, no figures; v2: minor revision

R2 v1 2026-06-23T17:20:34.052Z