Scaling Continuous Kernels with Sparse Fourier Domain Learning

Clayton Harper, Luke Wood, Peter Gerstoft, Eric C. Larson
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Abstract

We address three key challenges in learning continuous kernel representations: computational efficiency, parameter efficiency, and spectral bias. Continuous kernels have shown significant potential, but their practical adoption is often limited by high computational and memory demands. Additionally, these methods are prone to spectral bias, which impedes their ability to capture high-frequency details. To overcome these limitations, we propose a novel approach that leverages sparse learning in the Fourier domain. Our method enables the efficient scaling of continuous kernels, drastically reduces computational and memory requirements, and mitigates spectral bias by exploiting the Gibbs phenomenon.
利用稀疏傅立叶域学习扩展连续核
我们解决了学习连续核表示的三个关键挑战:计算效率、参数效率和频谱偏差。连续内核已显示出巨大的潜力,但其实际应用往往受到高计算量和内存需求的限制。此外,这些方法容易出现频谱偏差,从而影响捕捉高频细节的能力。为了克服这些局限性,我们提出了一种利用傅立叶域稀疏学习的新方法。我们的方法实现了连续核的高效扩展,大大降低了计算和内存需求,并通过利用吉布斯现象减轻了频谱偏差。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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