# Analysis of a one-dimensional forager-exploiter model

**Authors:** Youshan Tao, Michael Winkler

arXiv: 1902.00848 · 2019-02-05

## TL;DR

This paper analyzes a one-dimensional mathematical model describing social interactions in forager-exploiter groups, proving global existence, boundedness, and exponential stabilization of solutions under certain conditions.

## Contribution

It extends classical chemotaxis-consumption models by incorporating a second coupled mechanism and establishes global well-posedness and stability results.

## Key findings

- Global bounded classical solutions exist for all regular initial data.
- Solutions stabilize exponentially to a homogeneous equilibrium.
- Stability holds under a smallness condition on initial data mass.

## Abstract

\begin{abstract} \noindent % We consider the one-dimensional parabolic system   The system   \bas   \left\{ \begin{array}{l}   u_t= u_{xx} - \chi_1 (uw_x)_x, \\[1mm]   v_t = v_{xx} - \chi_2 (vu_x)_x, \\[1mm]   w_t = dw_{xx} - \lambda (u+v)w - \mu w + r,   \end{array} \right.   \eas % that has been proposed as a model to describe social interactions within mixed forager-exploiter groups. is considered in a bounded real interval, with positive parameters $\chi_1,\chi_2,d,\lambda$ and $\mu$, and with $r \ge 0$. Proposed to describe social interactions within mixed forager-exploiter groups, this model extends classical one-species chemotaxis-consumption systems by additionally accounting for a second axis mechanism coupled to the first in a consecutive manner. \abs % It is firstly shown that for all suitably regular initial data $(u_0, v_0, w_0)$, an associated Neumann-type initial-boundary value problem possesses a globally defined bounded classical solution. Moreover, it is asserted that this solution stabilizes to a spatially homogeneous equilibrium at an exponential rate under a smallness condition on $\min\{\io u_0, \io v_0\}$ that appears to be consistent with predictions obtained from formal stability analysis.\abs

## Full text

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## References

29 references — full list in the complete paper: https://tomesphere.com/paper/1902.00848/full.md

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Source: https://tomesphere.com/paper/1902.00848