Quantum Algorithms for Sampling Log-Concave Distributions and Estimating Normalizing Constants

TL;DR

This paper introduces quantum algorithms for efficiently sampling from log-concave distributions and estimating their normalizing constants, achieving speedups over classical methods by leveraging quantum techniques like quantum walks and Monte Carlo analogs.

Contribution

The authors develop quantum algorithms that match classical query complexities for sampling and provide quadratic and polynomial speedups for estimating normalizing constants.

Findings

Quantum algorithms match classical gradient-query complexities using only evaluation queries.

Achieve quadratic speedup in multiplicative error for normalizing constant estimation.

Prove near-optimal quantum lower bounds for estimating normalizing constants.

Abstract

Given a convex function $f\colon\mathbb{R}^{d}\to\mathbb{R}$, the problem of sampling from a distribution $\propto e^{-f(x)}$ is called log-concave sampling. This task has wide applications in machine learning, physics, statistics, etc. In this work, we develop quantum algorithms for sampling log-concave distributions and for estimating their normalizing constants $\int_{\mathbb{R}^d}e^{-f(x)}\mathrm{d} x$. First, we use underdamped Langevin diffusion to develop quantum algorithms that match the query complexity (in terms of the condition number $\kappa$ and dimension $d$) of analogous classical algorithms that use gradient (first-order) queries, even though the quantum algorithms use only evaluation (zeroth-order) queries. For estimating normalizing constants, these algorithms also achieve quadratic speedup in the multiplicative error $\epsilon$. Second, we develop quantum Metropolis-adjusted Langevin algorithms with query complexity $\widetilde{O}(\kappa^{1/2}d)$ and $\widetilde{O}(\kappa^{1/2}d^{3/2}/\epsilon)$ for log-concave sampling and normalizing constant estimation, respectively, achieving polynomial speedups in $\kappa,d,\epsilon$ over the best known classical algorithms by exploiting quantum analogs of the Monte Carlo method and quantum walks. We also prove a $1/\epsilon^{1-o(1)}$ quantum lower bound for estimating normalizing constants, implying near-optimality of our quantum algorithms in $\epsilon$.