Open AccessMyopic models of population dynamics on infinite networks
Author(s) -
Robert Carlson
Publication year - 2014
Publication title -
networks and heterogeneous media
Language(s) - English
Resource type - Journals
eISSN - 1556-181X
pISSN - 1556-1801
DOI - 10.3934/nhm.2014.9.477
Subject(s) - compactification (mathematics) , infinity , semigroup , reaction–diffusion system , mathematics , dynamics (music) , fidelity , diffusion , population , population model , algebra over a field , computer science , mathematical analysis , pure mathematics , physics , telecommunications , demography , sociology , acoustics , thermodynamics
Reaction-diffusion equations are treated on infinite networks using semigroup methods. To blend high fidelity local analysis with coarse remote modeling, initial data and solutions come from a uniformly closed algebra generated by functions which are flat at infinity. The algebra is associated with a compactification of the network which facilitates the description of spatial asymptotics. Diffusive effects disappear at infinity, greatly simplifying the remote dynamics. Accelerated diffusion models with conventional eigenfunctions expansions are constructed to provide opportunities for finite dimensional approximation.
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