The Complexity of Dynamic Matrix Problems

ERC (European Research Council)HORIZON-ERCID: 101039914
EC Contribution
€14,394
Consortium Size
1 orgs
Start Year
2022
Summary

Modern data analysis and optimization rely on our ability to process rapidly evolving dynamic datasets, often involving matrix operations in very high dimensions. Dynamic data structures enable fast information-retrieval on these huge databases by maintain- ing implicit information on the underlying data. As such, understanding the power and limitations of dynamic (matrix) data structures is a fundamental question in theory and practice. Despite decades of research, there are still very basic dynamic problems whose complexity is (exponen- tially) far from understood – Bridging this gap is one of the centerpieces of this proposal. The second theme of this proposal is advancing the nascent role of dynamic data structures in continuous optimization. For over a century, the traditional focus of optimization research was on minimizing the rate of convergence of local-search methods. The last ∼3 years have witnessed the dramatic potential of dynamic data structures in reducing the cost-per-iteration of (Newton type) optimization algorithms, proclaiming that the bottleneck to accelerating literally thousands of algorithms, is efficient maintenance of dynamic matrix functions. This new framework is only at its early stages, but already led to breakthroughs on decade-old problems in computer science. This proposal will substantially develop this interdisciplinary theory, and identifies the mathematical machinery which would lead to ultra-fast first and second-order convex optimization. In the non-convex setting, this proposal demonstrates the game-changing potential of dynamic data structures and algebraic sketching techniques in achieving scalable training and inference of deep neural networks, a major challenge of modern AI. Our program is based on a novel connection of Kernel methods and compressed sensing techniques for approximate matrix multiplication.

Consortium (1)

Project Results (6)

Source: CORDIS, the EU research results database.

Publications (6)
Discrepancy Minimization in Input-Sparsity Time
ICML 2025· 2025
Yichuan Deng, Xiaoyu Li, Zhao Song, Omri Weinstein
Hardness Amplification for Dynamic Binary Search Trees
ISAAC 2024· 2024
Shunhua Jiang, Victor Lecomte, Omri Weinstein and Sorrachai Yingchareonthawornchai
Algorithmica
Algorithmica· 2023DOI
Shunhua Jiang, Bento Natura, Omri Weinstein
Quartic Samples Suffice for Fourier Interpolation
FOCS2023· 2023DOI
Zhao Song Baocheng Sun Omri Weinstein Ruizhe Zhang
The Complexity of Dynamic Least-Squares Regression
FOCS 2023· 2023DOI
Jiang, Shunhua; Peng, Binghui; Weinstein, Omri
Fast Distance Oracles for Any Symmetric Norm
NeurIPS 2023· 2022
Deng, Yichuan; Song, Zhao; Weinstein, Omri; Zhang, Ruizhe