Segregation patterns for non-homogeneous locations in Schellings model
Metadatos:
Mostrar el registro completo del ítemAutor/es:
Pinasco, Damián
Schiaffino, Pablo
Arcón, Victoria
Caridi, Inés
Fecha:
2023Resumen
We study a variant of the classical spatial proximity Schelling’s segregation model,
including a function that breaks the homogeneity over the land. This weighting function
represents objective and subjective assessments or valuations of the territory. It justifies
why the agents give importance to their neighbors according to the locations they
occupy. In this new model, agents belong to two ethnic groups and react when a
proportion of their neighbors weighted with the land function is above a tolerance
parameter. We show that a smooth behavior of the weighting function, with few maxima
and minima, gives rise to large-scale segregation. In contrast, highly oscillating weights
generate more fragmented patterns, with smaller clusters. We present computational
simulations of this phenomenon and relate them to several American cities’ segregation
patterns. Also, we characterize the equilibria of the model as minimizers of a weighted,
discrete, Laplacian eigenvalue problem, derived from a Hamiltonian or total energy of
a particle system. This framework allows proving that total segregation results for the
particular condition of a weighting function with a single minimum, with two clusters
of maximum size. Besides, we predict the place where the clusters will appear. These
analytical results agree with computational simulations.
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