Directed Scattering for Knowledge Graph-based Cellular Signaling Analysis

Aarthi Venkat, Joyce Chew, Ferran Cardoso Rodriguez, Christopher J. Tape, Michael Perlmutter, Smita Krishnaswamy
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引用次数: 0

Abstract

Directed graphs are a natural model for many phenomena, in particular scientific knowledge graphs such as molecular interaction or chemical reaction networks that define cellular signaling relationships. In these situations, source nodes typically have distinct biophysical properties from sinks. Due to their ordered and unidirectional relationships, many such networks also have hierarchical and multiscale structure. However, the majority of methods performing node- and edge-level tasks in machine learning do not take these properties into account, and thus have not been leveraged effectively for scientific tasks such as cellular signaling network inference. We propose a new framework called Directed Scattering Autoencoder (DSAE) which uses a directed version of a geometric scattering transform, combined with the non-linear dimensionality reduction properties of an autoencoder and the geometric properties of the hyperbolic space to learn latent hierarchies. We show this method outperforms numerous others on tasks such as embedding directed graphs and learning cellular signaling networks.
基于知识图的定向散射蜂窝信号分析
有向图是许多现象的自然模型,特别是科学知识图,如分子相互作用或定义细胞信号传导关系的化学反应网络。在这些情况下,源节点通常具有与汇不同的生物物理特性。由于它们之间的关系是有序的、单向的,因此许多网络还具有层次结构和多尺度结构。然而,大多数在机器学习中执行节点和边缘级任务的方法没有考虑到这些属性,因此没有有效地利用科学任务,如蜂窝信号网络推理。我们提出了一种新的框架,称为定向散射自编码器(DSAE),它使用几何散射变换的定向版本,结合自编码器的非线性降维特性和双曲空间的几何特性来学习潜在层次。我们证明这种方法在嵌入有向图和学习蜂窝信号网络等任务上优于许多其他方法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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