TITLE:
Increasing of Resistance and Resilience of an Urban System against Calamities in the Light of the Maximum Ordinality Principle
AUTHORS:
Corrado Giannantoni, Laura Cennini
KEYWORDS:
Resistance and Resilience of Urban Systems, Maximum Ordinality Principle, Incipient Derivative
JOURNAL NAME:
Journal of Applied Mathematics and Physics,
Vol.9 No.8,
August
19,
2021
ABSTRACT: The present paper aims at showing how it is possible to requalify the structures of an urban system, in order to increase its resistance and its correlative resilience, against natural calamities (earthquakes, hurricanes, etc.), by adopting as reference criterion the Maximum Ordinality Principle (MOP). In this sense, the paper opens a radically new perspective in this field. In fact, the village assumed as a case study was modelled as a Self-Organizing System. This is because, although the village is usually considered as being solely made of buildings, streets, places and so on, in reality it has been conceived, planned and realized by human beings during several centuries. In addition, the people who actually leave in such an urban center, systematically deal with its maintenance, in order to possibly increase its functionality. This justifies the assumption of the village as being a Self-Organizing System and, consequently, it has been analyzed in the light of the MOP, which represents a valid reference principle for analyzing both “non-living”, “living” and “conscious” self-organizing systems.