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Research PaperResearchia:202607.15023

Low-Precision Rank Compensation for Matrices and Tensor Trains

Ibrahim El Mountasser

Abstract

Lower numerical precision reduces storage and memory traffic but raises the perturbation floor. We study rank compensation: reinvesting saved memory in a larger approximation rank. For matrices, the singular-value error identity yields a directly testable sufficient condition requiring the additional singular component to offset the perturbation from storing the rank-augmented approximation in lower precision. On ten SuiteSparse matrices, all 100 truncation-dominated configurations (50 FP32 and ...

Submitted: July 15, 2026Subjects: Mathematics; Mathematics

Description / Details

Lower numerical precision reduces storage and memory traffic but raises the perturbation floor. We study rank compensation: reinvesting saved memory in a larger approximation rank. For matrices, the singular-value error identity yields a directly testable sufficient condition requiring the additional singular component to offset the perturbation from storing the rank-augmented approximation in lower precision. On ten SuiteSparse matrices, all 100 truncation-dominated configurations (50 FP32 and 50 FP16) are certified non-increases and strict accuracy wins, with mean error ratio 0.9630.963 and storage ratios 58.8%58.8\% and 29.4%29.4\% relative to the FP64 baseline. FP16 failures occur only in tail-rank stress tests near the perturbation floor. At the largest resident matrix-application batch, compensated FP32 and FP16 achieve geometric-mean A100 speedups of 1.28×1.28\times and 2.12×2.12\times; neither accelerates the smallest batch. For Tensor-Train (TT) approximation, we give a conditional a posteriori extension based on the measured truncation gain and rounded-core perturbation. Across three-way and six-way synthetic tests, FP32 and FP16 achieve combined accuracy-memory wins in 10 of 20 and 14 of 20 trials. On public hyperspectral tensors and FROSTT top-active subtensors, the corresponding counts are 44 of 60 and 54 of 60; four FP16 Salinas-A tail-stress cases fail. No certified TT case exceeds the FP64 error beyond numerical tolerance. Reconstruction of six public tensors yields geometric-mean compensated speedups of 1.38×1.38\times (FP32) and 1.94×1.94\times (FP16). Timings cover resident downstream kernels, not factorization, transfers, or end-to-end acceleration.


Source: arXiv:2607.12969v1 - http://arxiv.org/abs/2607.12969v1 PDF: https://arxiv.org/pdf/2607.12969v1 Original Link: http://arxiv.org/abs/2607.12969v1

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Date:
Jul 15, 2026
Topic:
Mathematics
Area:
Mathematics
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