Dresden 2009 – scientific programme

Parts | Days | Selection | Search | Downloads | Help

AGSOE: Arbeitsgruppe Physik sozio-ökonomischer Systeme

AGSOE 19: Networks: From Topology to Dynamics IV

AGSOE 19.4: Talk

Thursday, March 26, 2009, 17:30–17:59, BAR 205

Public Transport Routes and Self-avoiding Walks — •Christian von Ferber^1,2, Taras Holovatch^1,3, Yurij Holovatch^4,5, and Vasyl Palchykov⁴ — ¹Applied Mathematics Research Centre, Coventry University, UK — ²Physikalisches Institut, Universität Freiburg — ³Laboratoire de Physique des Materiaux, Université Nancy, France — ⁴ICPM National Academy of Sciences of Ukraine, Lviv — ⁵Institut für Theoretische Physik, Universität Linz, Österreich

We explore the fractal dimensions of public transport routes of different cities with the finding that their fractal behaviour is close to that of self-avoiding walks. Self-avoiding walks, apart from observing the constraint of non-self-intersection evolve randomly. The fact that PT routes appear to display a similar scaling symmetry is quite unexpected. In particular, this behavior seems to be at odds with the requirement of minimizing passengers traveling time between origin to destination. The latter argument, however, ignores the time passengers spend walking to the initial and from the final stations. Including these, one understands the need for the routes to cover larger areas by meandering through neighborhoods. Given the requirements for a PTN to cover a metropolitan area with a limited number of routes while simultaneously offering fast transport across the city routes scaling like SAWs may present an optimal solution.