FFT-OT:一种快速最优运输算法

Na Lei, X. Gu
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引用次数: 6

摘要

最优运输图找到将一个概率测度运输到另一个概率测度的最经济的方式。它在视觉、深度学习和医学图像等领域得到了广泛的应用。根据Brenier理论,计算最优运输图相当于求解monge - ampantere方程。由于交通地图的高度非线性性质,大比例尺的最优交通地图的计算非常具有挑战性。这项工作提出了一个简单而强大的方法,FFT-OT算法,基于三个关键思想来解决这个困难。首先,将求解monge - ampantere方程转化为不动点问题;其次,将最优运输映射的倾斜度性质重新表述为矩形域上的Neumann边界条件;第三,在每次迭代中应用FFT求解泊松方程,以提高效率。对三维扫描捕获的表面和医学成像重建的表面进行了实验,并与其他现有方法进行了比较。实验结果表明,本文提出的FFT-OT算法具有简单、通用、可扩展性强、效率高、精度高等特点。
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FFT-OT: A Fast Algorithm for Optimal Transportation
An optimal transportation map finds the most economical way to transport one probability measure to the other. It has been applied in a broad range of applications in vision, deep learning and medical images. By Brenier theory, computing the optimal transport map is equivalent to solving a Monge-Ampère equation. Due to the highly non-linear nature, the computation of optimal transportation maps in large scale is very challenging.This work proposes a simple but powerful method, the FFT-OT algorithm, to tackle this difficulty based on three key ideas. First, solving Monge-Ampère equation is converted to a fixed point problem; Second, the obliqueness property of optimal transportation maps are reformulated as Neumann boundary conditions on rectangular domains; Third, FFT is applied in each iteration to solve a Poisson equation in order to improve the efficiency.Experiments on surfaces captured from 3D scanning and reconstructed from medical imaging are conducted, and compared with other existing methods. Our experimental results show that the proposed FFT-OT algorithm is simple, general and scalable with high efficiency and accuracy.
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