近年来,生成的对抗性网络(GANS)已经证明了令人印象深刻的实验结果,同时只有一些作品促进了统计学习理论。在这项工作中,我们提出了一种用于生成对抗性学习的无限尺寸理论框架。假设统一界限的$ k $-times $ \ alpha $ -h \“较旧的可分辨率和统一的正密度,我们表明Rosenblatt的转换引起了最佳发电机,可在$ \ alpha $的假设空间中可实现H \“较旧的微分发电机。通过一致的鉴别者假设空间的定义,我们进一步表明,在我们的框架中,由发电机引起的分布与来自对手学习过程的分布之间的jensen-shannon发散,并且数据生成分布会聚到零。在足够严格的规律性假设下对数据产生过程密度的假设,我们还基于浓度和链接提供会聚率。
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We propose a novel deep learning architecture for regressing disparity from a rectified pair of stereo images. We leverage knowledge of the problem's geometry to form a cost volume using deep feature representations. We learn to incorporate contextual information using 3-D convolutions over this volume. Disparity values are regressed from the cost volume using a proposed differentiable soft argmin operation, which allows us to train our method end-to-end to sub-pixel accuracy without any additional post-processing or regularization. We evaluate our method on the Scene Flow and KITTI datasets and on KITTI we set a new stateof-the-art benchmark, while being significantly faster than competing approaches.
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