Multi-source domain adaptation using C⁁1-smooth subspaces interpolation

Jorge Batista, K. Krakowski, Luís Machado, P. Martins, F. Leite
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引用次数: 4

Abstract

Manifold-based domain adaptation algorithms are receiving increasing attention in computer vision to model distribution shifts between source and target domain. In contrast to early works, that mainly explore intermediate subspaces along geodesics, in this work we propose to interpolate subspaces through C1-smooth curves on the Grassmann manifold. The new methodis based on the geometric Casteljau algorithm that is used to generate smooth interpolating polynomial curves on non-euclidean spaces and can be extended to generate polynomial splines that interpolate a given set of data on the Grassmann manifold. To evaluate the usefulness of the proposed interpolating curves on vision related problems, several experiments were conducted. We show the advantage of using smooth subspaces interpolation in multi-source unsupervised domain adaptation problems and in object recognition problems across datasets.
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基于C - log -光滑子空间插值的多源域自适应
基于流形的域自适应算法用于模拟源域和目标域之间的分布变化,在计算机视觉领域受到越来越多的关注。与早期主要沿着测地线探索中间子空间的工作相反,在这项工作中,我们提出通过c1 -光滑曲线在Grassmann流形上插值子空间。该方法基于几何Casteljau算法,该算法用于在非欧几里德空间上生成光滑的插值多项式曲线,并可扩展到生成多项式样条,在Grassmann流形上对给定数据集进行插值。为了评估所提出的插值曲线在视觉相关问题上的有效性,进行了几个实验。我们展示了在多源无监督域自适应问题和跨数据集的目标识别问题中使用光滑子空间插值的优势。
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