Partial differential equations (PDEs) are typically used as models of physical processes but are also of great interest in PDE-based image processing. However, when it comes to their use in imaging, conventional numerical methods for solving PDEs tend to require very fine grid resolution for stability, and as a result have impractically high computational cost. This work applies BLADE (Best Linear Adaptive Enhancement), a shallow learnable filtering framework, to PDE solving, and shows that the resulting approach is efficient and accurate, operating more reliably at coarse grid resolutions than classical methods. As such, the model can be flexibly used for a wide variety of problems in imaging.
翻译:部分差异方程式(PDEs)通常用作物理过程的模型,但也对基于PDE的图像处理非常感兴趣,然而,在成像应用时,解决PDE的常规数字方法往往需要非常精细的网格分辨率才能稳定,因此计算成本不切实际。 这项工作将BLADE(最大线性适应增强),一个浅浅的可学习过滤框架,用于PDE的解决,并表明由此产生的方法既有效又准确,比传统方法更可靠地以粗糙的网格分辨率运行。 因此,该模型可以灵活地用于解决成像方面的广泛问题。
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