Fast expansion into harmonics on the disk: a steerable basis with fast radial convolutions

Nicholas F. Marshall, Oscar Mickelin, A. Singer
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引用次数: 4

Abstract

We present a fast and numerically accurate method for expanding digitized $L \times L$ images representing functions on $[-1,1]^2$ supported on the disk $\{x \in \mathbb{R}^2 : |x|<1\}$ in the harmonics (Dirichlet Laplacian eigenfunctions) on the disk. Our method, which we refer to as the Fast Disk Harmonics Transform (FDHT), runs in $O(L^2 \log L)$ operations. This basis is also known as the Fourier-Bessel basis, and it has several computational advantages: it is orthogonal, ordered by frequency, and steerable in the sense that images expanded in the basis can be rotated by applying a diagonal transform to the coefficients. Moreover, we show that convolution with radial functions can also be efficiently computed by applying a diagonal transform to the coefficients.
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快速扩展到磁盘上的谐波:具有快速径向旋转的可操纵基础
本文提出了一种快速、精确的方法,用于将磁盘$\{x \上支持的$[-1,1]^2$上的函数在$ mathbb{R}^2: |x|<1\}$上的谐波(Dirichlet Laplacian特征函数)展开。我们的方法,我们称之为快速磁盘谐波变换(FDHT),运行在$O(L^2 \log L)$操作中。这个基也被称为傅里叶-贝塞尔基,它有几个计算上的优点:它是正交的,按频率排序,并且在这个意义上是可操纵的,在基中扩展的图像可以通过对系数进行对角变换来旋转。此外,我们还表明,通过对系数进行对角变换,也可以有效地计算径向函数的卷积。
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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