Approximating Output Probabilities of Shallow Quantum Circuits which are Geometrically-local in any Fixed Dimension

TL;DR

This paper extends classical algorithms for approximating output probabilities of shallow, geometrically-local quantum circuits to any fixed dimension, enabling efficient computation across higher dimensions with recursive divide-and-conquer techniques.

Contribution

It generalizes previous results from 3D to arbitrary fixed dimensions, introducing modifications to existing recursive algorithms for higher-dimensional quantum circuit analysis.

Findings

Efficient classical approximation for any fixed dimension D.

Recursive divide-and-conquer approach adapts to higher dimensions.

Algorithm runs in quasi-polynomial time for polylogarithmic-depth circuits.

Abstract

We present a classical algorithm that, for any $D$-dimensional geometrically-local, quantum circuit $C$ of polylogarithmic-depth, and any bit string $x \in {0,1}^n$, can compute the quantity $|<x|C|0^{\otimes n}>|^2$ to within any inverse-polynomial additive error in quasi-polynomial time, for any fixed dimension $D$. This is an extension of the result [CC21], which originally proved this result for $D = 3$. To see why this is interesting, note that, while the $D = 1$ case of this result follows from standard use of Matrix Product States, known for decades, the $D = 2$ case required novel and interesting techniques introduced in [BGM19]. Extending to the case $D = 3$ was even more laborious and required further new techniques introduced in [CC21]. Our work here shows that, while handling each new dimension has historically required a new insight, and fixed algorithmic primitive, based on known techniques for $D \leq 3$, we can now handle any fixed dimension $D > 3$. Our algorithm uses the Divide-and-Conquer framework of [CC21] to approximate the desired quantity via several instantiations of the same problem type, each involving $D$-dimensional circuits on about half the number of qubits as the original. This division step is then applied recursively, until the width of the recursively decomposed circuits in the $D^{th}$ dimension is so small that they can effectively be regarded as $(D-1)$-dimensional problems by absorbing the small width in the $D^{th}$ dimension into the qudit structure at the cost of a moderate increase in runtime. The main technical challenge lies in ensuring that the more involved portions of the recursive circuit decomposition and error analysis from [CC21] still hold in higher dimensions, which requires small modifications to the analysis in some places.