DIFFUSION OF NEW PRODUCTS WITH RECOVERING CONSUMERS
Authored by G Fibich
Date Published: 2017
DOI: 10.1137/17m1112546
Sponsors:
United States Department of Energy (DOE)
United States National Science Foundation (NSF)
Platforms:
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Model Documentation:
Other Narrative
Mathematical description
Model Code URLs:
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Abstract
We consider the diffusion of new products in the discrete Bass-SIR
model, in which consumers who adopt the product can later ``recover{''}
and stop influencing their peers to adopt the product. To gain insight
into the effect of the social network structure on the diffusion, we
focus on two extreme cases. In the ``most-connected{''} configuration,
where all consumers are interconnected (complete network), averaging
over all consumers leads to an aggregate model, which combines the Bass
model for diffusion of new products with the SIR model for epidemics. In
the ``least-connected{''} configuration, where consumers are arranged in
a circle and each consumer can be influenced only by the neighbor to the
left (one-sided 1D network), averaging over all consumers leads to a
different aggregate model which is linear and can be solved explicitly.
We conjecture that for any other network, the diffusion is bounded from
below and from above by that on a one-sided 1D network and on a complete
network, respectively. When consumers are arranged in a circle and each
consumer can be influenced by the neighbors to the left and right
(two-sided 1D network), the diffusion is strictly faster than on a
one-sided 1D network. This is different from the case of nonrecovering
adopters, where the diffusion on one-sided and two-sided 1D networks is
identical. We also propose a nonlinear model for recoveries and show
that consumers' heterogeneity has a negligible effect on the aggregate
diffusion.
Tags
Agent-based models
models
Dynamics
networks
Adoption
marketing
Bass model
Diffusion in social networks
Sir model