Quantum Algorithms for Projection-Free Sparse Convex Optimization
Abstract
This paper considers the projection-free sparse convex optimization problem for the vector domain and the matrix domain, which covers a large number of important applications in machine learning and data science. For the vector domain , we propose two quantum algorithms for sparse constraints that finds a -optimal solution with the query complexity of and by using the function value oracle, reducing a factor of and over the best classical algorithm, respectively, where is the dimension. For the matrix domain , we propose two quantum algorithms for nuclear norm constraints that improve the time complexity to and for computing the update step, reducing at least a factor of over the best classical algorithm, where is the rank of the gradient matrix. Our algorithms show quantum advantages in projection-free sparse convex optimization problems as they outperform the optimal classical methods in dependence on the dimension .
Cite
@article{arxiv.2507.08543,
title = {Quantum Algorithms for Projection-Free Sparse Convex Optimization},
author = {Jianhao He and John C. S. Lui},
journal= {arXiv preprint arXiv:2507.08543},
year = {2025}
}