English

Inv-ASKIT: A Parallel Fast Diret Solver for Kernel Matrices

Numerical Analysis 2016-02-04 v1 Data Structures and Algorithms Mathematical Software

Abstract

We present a parallel algorithm for computing the approximate factorization of an NN-by-NN kernel matrix. Once this factorization has been constructed (with Nlog2NN \log^2 N work), we can solve linear systems with this matrix with NlogNN \log N work. Kernel matrices represent pairwise interactions of points in metric spaces. They appear in machine learning, approximation theory, and computational physics. Kernel matrices are typically dense (matrix multiplication scales quadratically with NN) and ill-conditioned (solves can require 100s of Krylov iterations). Thus, fast algorithms for matrix multiplication and factorization are critical for scalability. Recently we introduced ASKIT, a new method for approximating a kernel matrix that resembles N-body methods. Here we introduce INV-ASKIT, a factorization scheme based on ASKIT. We describe the new method, derive complexity estimates, and conduct an empirical study of its accuracy and scalability. We report results on real-world datasets including "COVTYPE" (0.50.5M points in 54 dimensions), "SUSY" (4.54.5M points in 8 dimensions) and "MNIST" (2M points in 784 dimensions) using shared and distributed memory parallelism. In our largest run we approximately factorize a dense matrix of size 32M ×\times 32M (generated from points in 64 dimensions) on 4,096 Sandy-Bridge cores. To our knowledge these results improve the state of the art by several orders of magnitude.

Keywords

Cite

@article{arxiv.1602.01376,
  title  = {Inv-ASKIT: A Parallel Fast Diret Solver for Kernel Matrices},
  author = {Chenhan D. Yu and William B. March and Bo Xiao and George Biros},
  journal= {arXiv preprint arXiv:1602.01376},
  year   = {2016}
}

Comments

11 pages, 2 figures, to appear in IPDPS 2016

R2 v1 2026-06-22T12:42:57.103Z