Wasserstein gradient flow for optimal probability measure decomposition
引用次数: 0
Abstract
We examine the infinite-dimensional optimization problem of finding a decomposition of a probability measure into K probability sub-measures to minimize specific loss functions inspired by applications in clustering and user grouping. We analytically explore the structures of the support of optimal sub-measures and introduce algorithms based on Wasserstein gradient flow, demonstrating their convergence. Numerical results illustrate the implementability of our algorithms and provide further insights.最优概率度量分解的瓦瑟斯坦梯度流
受聚类和用户分组应用的启发,我们研究了一个无限维优化问题,即如何将一个概率度量分解为 K 个概率子度量,以最小化特定的损失函数。我们分析探索了最优子度量支持的结构,并引入了基于瓦瑟斯坦梯度流的算法,证明了它们的收敛性。数值结果表明了我们算法的可实施性,并提供了进一步的见解。
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