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On a generalized population dynamics equation with environmental noise
Statistics & Probability Letters, Volume: 168, Start page: 108944
Swansea University Author:
Jiang-lun Wu
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DOI (Published version): 10.1016/j.spl.2020.108944
Abstract
We establish the existence and uniqueness of global (in time) positive strong solutions for a generalized population dynamics equation with environmental noise, while the global existence fails for the deterministic equation. Particularly, we prove the global existence of positive strong solutions f...
| Published in: | Statistics & Probability Letters |
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| ISSN: | 0167-7152 |
| Published: |
ELSEVIER
Elsevier BV
2021
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| Online Access: |
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| URI: | https://cronfa.swan.ac.uk/Record/cronfa55191 |
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| Abstract: |
We establish the existence and uniqueness of global (in time) positive strong solutions for a generalized population dynamics equation with environmental noise, while the global existence fails for the deterministic equation. Particularly, we prove the global existence of positive strong solutions for the followingstochastic differential equation\begin{eqnarray*}dX_t=(\theta X_t^{m_0}+kX_t^m)dt+\varepsilon X_t^{\frac{m+1}{2}}\varphi(X_t)dW_t, \ t>0, \ X_t>0,\ m> m_0\geq 1,\ \X_0=x>0,\end{eqnarray*}with $\theta,k,\varepsilon\in \mR$ being constants and $\varphi(r)=r^{\vartheta}$ or $|\log(r)|^{\vartheta} \ (\vartheta>0)$, and we also show that the index $\vartheta>0$ is sharp in the sense that if $\vartheta=0$, one can choose certain proper constants $\theta,k$ and $\varepsilon$ such that the solution $X_t$ will explode in a finite time almost surely. |
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| Keywords: |
Stochastic differential equation; Environmental noise; Explosion; Positive strong solution. |
| College: |
Faculty of Science and Engineering |
| Start Page: |
108944 |