On the exact quantum query complexity of $\text{MOD}_m^n$ and $\text{EXACT}_{k,l}^n$

TL;DR

This paper determines the exact quantum query complexity for specific symmetric functions, including MOD and EXACT functions, providing optimal algorithms and settling previous conjectures in quantum query complexity.

Contribution

It presents optimal quantum algorithms for MOD and certain EXACT functions, resolving conjectures and advancing understanding of symmetric function complexities.

Findings

Optimal quantum algorithm for MOD_m^n with query complexity ⌈n(1−1/m)⌉

Exact quantum algorithms for specific EXACT_{k,l}^n functions

Resolution of conjectures on symmetric function complexities

Abstract

The query model has generated considerable interest in both classical and quantum computing communities. Typically, quantum advantages are demonstrated by showcasing a quantum algorithm with a better query complexity compared to its classical counterpart. Exact quantum query algorithms play a pivotal role in developing quantum algorithms. For example, the Deutsch-Jozsa algorithm demonstrated exponential quantum advantages over classical deterministic algorithms. As an important complexity measure, exact quantum query complexity describes the minimum number of queries required to solve a specific problem exactly using a quantum algorithm. In this paper, we consider the exact quantum query complexity of the following two $n$-bit symmetric functions $\text{MOD}_m^n:\{0,1\}^n \rightarrow \{0,...,m-1\}$ and $\text{EXACT}_{k,l}^n:\{0,1\}^n \rightarrow \{0,1\}$, which are defined as $\text{MOD}_m^n(x) = |x| \bmod m$ and $ \text{EXACT}_{k,l}^n(x) = 1$ iff $|x| \in \{k,l\}$, where $|x|$ is the number of $1$'s in $x$. Our results are as follows: i) We present an optimal quantum algorithm for computing $\text{MOD}_m^n$, achieving a query complexity of $\lceil n(1-\frac{1}{m}) \rceil$ for $1 < m \le n$. This settles a conjecture proposed by Cornelissen, Mande, Ozols and de Wolf (2021). Based on this algorithm, we show the exact quantum query complexity of a broad class of symmetric functions that map $\{0,1\}^n$ to a finite set $X$ is less than $n$. ii) When $l-k \ge 2$, we give an optimal exact quantum query algorithm to compute $\text{EXACT}_{k,l}^n$ for the case $k=0$ or $k=1,l=n-1$. This resolves the conjecture proposed by Ambainis, Iraids and Nagaj (2017) partially.