Reducing dimension redundancy to find simplifying patterns in high-dimensional datasets and complex networks has become a major endeavor in many scientific fields. However, detecting the dimensionality of their latent space is challenging but necessary to generate efficient embeddings to be used in a multitude of downstream tasks. Here, we propose a method to infer the dimensionality of networks without the need for any a priori spatial embedding. Due to the ability of hyperbolic geometry to capture the complex connectivity of real networks, we detect ultra low dimensionality far below values reported using other approaches. We applied our method to real networks from different domains and found unexpected regularities, including: tissue-sp...
The arrangement of network nodes in hyperbolic spaces has become a widely studied problem, motivated...
Many real-world networks are essentially heterogeneous, where the nodes have di®erent abilities to g...
We propose a new measure to characterize the dimension of complex networks based on the ergodic theo...
One of the pillars of the geometric approach to networks has been the development of model-based map...
Over the last decade, random hyperbolic graphs have proved successful in providing geometric explana...
The dimension of a system is one of the most fundamental quantities to characterize its structure an...
The arrangement of network nodes in hyperbolic spaces has become a widely studied problem, motivated...
Abstract One of the pillars of the geometric approach to networks has been the development of model-...
In this article we address the concept of correlation dimension which has been recently extended to ...
Dimension is a fundamental property of objects and the space in which they are embedded. Yet ideal n...
Traditionally, spectral methods such as principal component analysis (PCA) have been applied to many...
BACKGROUND: Networks or graphs play an important role in the biological sciences. Protein interactio...
Complex networks are mathematical representations of the interaction patterns of complex systems. Du...
The human brain connectome is a topologically complex, spatially embedded network. One of the charac...
Network science is driven by the question which properties large real-world networks have and how we...
The arrangement of network nodes in hyperbolic spaces has become a widely studied problem, motivated...
Many real-world networks are essentially heterogeneous, where the nodes have di®erent abilities to g...
We propose a new measure to characterize the dimension of complex networks based on the ergodic theo...
One of the pillars of the geometric approach to networks has been the development of model-based map...
Over the last decade, random hyperbolic graphs have proved successful in providing geometric explana...
The dimension of a system is one of the most fundamental quantities to characterize its structure an...
The arrangement of network nodes in hyperbolic spaces has become a widely studied problem, motivated...
Abstract One of the pillars of the geometric approach to networks has been the development of model-...
In this article we address the concept of correlation dimension which has been recently extended to ...
Dimension is a fundamental property of objects and the space in which they are embedded. Yet ideal n...
Traditionally, spectral methods such as principal component analysis (PCA) have been applied to many...
BACKGROUND: Networks or graphs play an important role in the biological sciences. Protein interactio...
Complex networks are mathematical representations of the interaction patterns of complex systems. Du...
The human brain connectome is a topologically complex, spatially embedded network. One of the charac...
Network science is driven by the question which properties large real-world networks have and how we...
The arrangement of network nodes in hyperbolic spaces has become a widely studied problem, motivated...
Many real-world networks are essentially heterogeneous, where the nodes have di®erent abilities to g...
We propose a new measure to characterize the dimension of complex networks based on the ergodic theo...