Limiting Speed and Fluctuations for the Boundary Modified Contact Process
Abstract
The boundary modified contact process models an epidemic spreading in one dimension with two infection parameters, λi and λe. Starting from a finite infected set, each edge of Z transmits the infection at rate λi except for the rightmost and leftmost edges incident to infected vertices, which transmit the infection at rate λe. We show a strong law of large numbers and central limit theorem for the location of the rightmost infected vertex when λi = λc and λe = λc + . We also show stretched exponential tail bounds in the fluctuations of the rightmost infected vertex, the extinction time of the process on the event of non-survival, and the probability of survival given the size of the initial infected region. Our results extend to the boundary modified contact process whenever λc ≤ λi < λe, and solves an open problem first proposed by Andjel and Rolla in [1].
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