# Separation of time-scales for the seed bank diffusion and its   jump-diffusion limit

**Authors:** Jochen Blath, Eugenio Buzzoni, Adri\'an Gonz\'alez Casanova, Maite, Wilke-Berenguer

arXiv: 1903.11795 · 2019-03-29

## TL;DR

This paper studies the scaling limits of seed bank diffusion models with different time-scales for reproduction and migration, revealing conditions under which the limit becomes a jump-diffusion, especially relevant for bacterial dormancy.

## Contribution

It introduces a novel approach using duality to identify the limit of seed bank diffusions under separation of time-scales, bypassing technical convergence issues.

## Key findings

- The limit process is a jump-diffusion under certain scaling regimes.
- Standard convergence methods fail due to path regularity issues.
- Duality provides a robust way to identify the limiting process.

## Abstract

We investigate the scaling limit of the seed bank diffusion when reproduction and migration (to and from the seed bank) happen on different time-scales. More precisely, we consider the case when migration is `slow' and reproduction is `standard' (in the original time-scale) and then switch to a new, accelerated time-scale, where migration is `standard' and reproduction is `fast'. This is motivated by models for bacterial dormancy, where periods of quiescence can be orders of magnitude larger than reproductive times, and where it is expected to find non-trivial degenerate genealogies on the evolutionary time-scale.   However, the above scaling regime is not only interesting from a biological perspective, but also from a mathematical point of view, since it provides a prototypical example where the expected scaling limit of a continuous diffusion should (and will be) a jump-diffusion. For this situation, standard convergence results often seem to fail in multiple ways. For example, since the set of continuous paths from a closed subset of the c\`adl\`ag paths in each of the classical Skorohod topologies $J_1, J_2, M_1$ and $M_2$, none of them can be employed for tightness on path-space. Further, a na\"ive direct rescaling of the Markov generator corresponding to the continuous diffusion immediately leads to a blow-up of the diffusion coefficient. Still, one can identify a well-defined limit via duality in a surprisingly non-technical way. Indeed, we show that a certain duality relation is in some sense stable under passage to the limit and allows an identification of the limit, avoiding all technicalities related to the blow-up in the classical generator. The result then boils down to a convergence criterion for time-continuous Markov chains in a separation of time-scales regime, which is of independent interest.

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## Figures

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## References

20 references — full list in the complete paper: https://tomesphere.com/paper/1903.11795/full.md

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Source: https://tomesphere.com/paper/1903.11795