네트워크 과학 (Network Science) 해외 석학 초빙 특강에 여러분들의 많은 관심 바랍니다.
We cordially invite you to the series of lecture and seminars in Network Science.
Contact: Professor Juyong Park (2924, email@example.com )
Speaker: Gourab Ghoshal
Assistant Professor, U of Rochester Physics, Computer Science & Mathematics
MIT Media Lab Research Fellow
Ph.D. in Physics from University of Michigan (advisor: Mark Newman)
Network Science Seminar 2: Jan 16 (Tues) 13:00~14:30 Paik Nam June Hall, N25
Title: Urban morphology and structural invariants in street networks.
Streets networks are the primary facilitators of movement in urban systems, allowing residents to navigate the different functional components of a city. Since navigability is a key ingredient of socioeconomic activity, roads represent one of its most important infrastructural components and a large body of work has elucidated its structural properties. Yet more than the physical layout, it is the sampling of street networks that serves as a true fingerprint of the complex interactions between people, and the flow of goods and services in urban systems, a feature of which there is limited understanding.
In this talk, I’ll describe attempts to fill this gap, by describing a systematic mesoscale study of street morphology (shape of sampled routes) through the introduction of a novel metric termed , inness. The inness encapsulates the direction, orientation and length of routes, thus revealing the morphology of connectivity in street networks, including the distribution of implicit socioeconomic forces that may inform routing choices. In particular, this metric enables us to put functions of individual streets in the context of the dynamics of the whole city (Broadway or Fifth avenue in NYC, for instance), linking local structures to large-scale urban organization.
The dynamics of a city of course is intricately related to the flow of people and goods and services, a structural measure of which is the betweenness centrality. I’ll show that the global distribution of betweenness is an invariant quantity once one accounts for the proper scale and provide a qualitative analytical description, based on Minimal Spanning Trees embedded in 2D space, to explain this remarkable invariance. Practical implications of this observation as it relates to urban planning will be explored.