What Are the Effects of Diffusing Boundaries on Random Walkers in 1D Lattices?

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The discussion centers on the effects of diffusing boundaries on random walkers in one-dimensional lattices. Participants highlight the extensive research on 1D discrete random walks as Markov chains, noting that net work done is linked to displacement from the origin over time. It is clarified that with bounded ranges, net work approaches zero as time increases. However, with an absorbing boundary, there is a finite non-zero amount of net work equal to the particle's displacement to the boundary. In contrast, a reflecting boundary results in an average net work of zero over time.
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Hi all,

I was wondering whether there was any work done on a random walker on a 1D lattice with diffusing boundaries?

Any links or suggestions would be great!
 
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In terms of net work done, the answer would be based on the amount of displacement from the origin over an interval of time. If the range is bounded, then the amount of net work done would approach zero as time approaches infinity.

EDIT: While I stand by what I said; there will be a finite non-zero amount of net work done with an absorbing boundary for a unit particle, equal to the displacement of the particle from the origin to the boundary. For a reflecting boundary the average net amount work done over time is zero.
 
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