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Main Authors: Ringoot, Evelyne, Alomairy, Rabab, Edelman, Alan
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2510.12705
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author Ringoot, Evelyne
Alomairy, Rabab
Edelman, Alan
author_facet Ringoot, Evelyne
Alomairy, Rabab
Edelman, Alan
contents The reduction of a banded matrix to bidiagonal form is a critical step in the calculation of Singular Values, a cornerstone of scientific computing and AI. Although inherently parallel, this step has traditionally been considered unsuitable for GPUs due to its memory-bound nature. However, recent advances in GPU architectures, such as increased L1 memory per Streaming Multiprocessor or Compute Unit and larger L2 caches, have shifted this paradigm. In this work, we present the first GPU-accelerated algorithm for reducing a banded matrix to bidiagonal form, integrated into open-source software package NextLA$.$jl. Our algorithm builds on prior multicore CPU cache-efficient bulge chasing methods, adapted to modern GPU architecture to optimize throughput. Leveraging Julia's high-level array abstractions and KernelAbstractions, we implement a single function that is both hardware-agnostic and data-precision-aware, running efficiently across NVIDIA, AMD, Intel, and Apple Metal GPUs. We develop a hardware-aware performance model to guide tuning and identify key hyperparameters that govern optimal GPU performance for memory-bound workloads. We show that such workloads, when carefully optimized, can achieve substantial speed-ups on modern GPUs: our implementation outperforms multithreaded CPU libraries PLASMA and SLATE starting from matrix sizes as small as 1024 x 1024, and achieves over 100x speed-up on 32k x 32k matrices. Moreover, the algorithm's performance scales linearly with the matrix bandwidth, enabling efficient reduction of matrices with larger bandwidths - previously considered impractical.
format Preprint
id arxiv_https___arxiv_org_abs_2510_12705
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Accelerating Bidiagonalization of Banded Matrices through Memory-Aware Bulge-Chasing on GPUs
Ringoot, Evelyne
Alomairy, Rabab
Edelman, Alan
Distributed, Parallel, and Cluster Computing
Mathematical Software
The reduction of a banded matrix to bidiagonal form is a critical step in the calculation of Singular Values, a cornerstone of scientific computing and AI. Although inherently parallel, this step has traditionally been considered unsuitable for GPUs due to its memory-bound nature. However, recent advances in GPU architectures, such as increased L1 memory per Streaming Multiprocessor or Compute Unit and larger L2 caches, have shifted this paradigm. In this work, we present the first GPU-accelerated algorithm for reducing a banded matrix to bidiagonal form, integrated into open-source software package NextLA$.$jl. Our algorithm builds on prior multicore CPU cache-efficient bulge chasing methods, adapted to modern GPU architecture to optimize throughput. Leveraging Julia's high-level array abstractions and KernelAbstractions, we implement a single function that is both hardware-agnostic and data-precision-aware, running efficiently across NVIDIA, AMD, Intel, and Apple Metal GPUs. We develop a hardware-aware performance model to guide tuning and identify key hyperparameters that govern optimal GPU performance for memory-bound workloads. We show that such workloads, when carefully optimized, can achieve substantial speed-ups on modern GPUs: our implementation outperforms multithreaded CPU libraries PLASMA and SLATE starting from matrix sizes as small as 1024 x 1024, and achieves over 100x speed-up on 32k x 32k matrices. Moreover, the algorithm's performance scales linearly with the matrix bandwidth, enabling efficient reduction of matrices with larger bandwidths - previously considered impractical.
title Accelerating Bidiagonalization of Banded Matrices through Memory-Aware Bulge-Chasing on GPUs
topic Distributed, Parallel, and Cluster Computing
Mathematical Software
url https://arxiv.org/abs/2510.12705