English

Influence in Completely Bounded Block-multilinear Forms and Classical Simulation of Quantum Algorithms

Quantum Physics 2022-03-02 v1 Computational Complexity Functional Analysis

Abstract

The Aaronson-Ambainis conjecture (Theory of Computing '14) says that every low-degree bounded polynomial on the Boolean hypercube has an influential variable. This conjecture, if true, would imply that the acceptance probability of every dd-query quantum algorithm can be well-approximated almost everywhere (i.e., on almost all inputs) by a poly(d)\mathrm{poly}(d)-query classical algorithm. We prove a special case of the conjecture: in every completely bounded degree-dd block-multilinear form with constant variance, there always exists a variable with influence at least 1/poly(d)1/\mathrm{poly}(d). In a certain sense, such polynomials characterize the acceptance probability of quantum query algorithms, as shown by Arunachalam, Bri\"et and Palazuelos (SICOMP '19). As a corollary we obtain efficient classical almost-everywhere simulation for a particular class of quantum algorithms that includes for instance kk-fold Forrelation. Our main technical result relies on connections to free probability theory.

Cite

@article{arxiv.2203.00212,
  title  = {Influence in Completely Bounded Block-multilinear Forms and Classical Simulation of Quantum Algorithms},
  author = {Nikhil Bansal and Makrand Sinha and Ronald de Wolf},
  journal= {arXiv preprint arXiv:2203.00212},
  year   = {2022}
}

Comments

21 pages, 2 figures

R2 v1 2026-06-24T09:57:18.524Z