Poonsuk Lohsoonthorn scite author profile

Abstract:In this article, the δ-hyperbolic concept, originally developed for infinite graphs, is adapted to very large but finite graphs. Such graphs can indeed exhibit properties typical of negatively curved spaces, yet the traditional δ-hyperbolic concept, which requires existence of an upper bound on the fatness δ of the geodesic triangles, is unable to capture those properties, as any finite graph has finite δ. Here the idea is to scale δ relative to the diameter of the geodesic triangles and use the Cartan-AlexandrovToponogov (CAT) theory to derive the thresholding value of δ/diam below which the geometry has negative curvature properties.

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On a standing wave Central Pattern Generator and the coherence problem

Jonckheere

Lohsoonthorn

Musuvathy

et al. 2010

Biomedical Signal Processing and Control

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Scaled Gromov Four-Point Condition for Network Graph Curvature Computation

Jonckheere¹,

Lohsoonthorn²,

Ariaei³

2011

Internet Mathematics

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In this paper, we extend the concept of scaled Gromov hyperbolic graph, originally developed for the thin triangle condition (TTC), to the computationally simplified, but less intuitive, four-point condition (FPC). The original motivation was that for a large but finite network graph to enjoy some of the typical properties to be expected in negatively curved Riemannian manifolds, the delta measuring the thinness of a triangle scaled by its diameter must be below a certain threshold all across the graph. Here we develop various ways of scaling the 4-point delta, and develop upper bounds for the scaled 4-point delta in various spaces. A significant theoretical advantage of the TTC over the FPC is that the latter allows for a Gromov-like characterization of Ptolemaic spaces. As a major network application, it is shown that scale-free networks tend to be scaled Gromov hyperbolic, while small-world networks are rather scaled positively curved.

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