Stochastic Lotka-Volterra system with unbounded distributed delay (Q986654)

The paper discusses the following stochastic Lotka-Volterra system with infinite delay: \[ \dot{x}(t)=\text{diag}\left( x_1(t),\cdots,x_n(t)\right)\left(r+Ax(t)+B\int_{-\infty}^0x(t+\theta)d\mu(\theta)\right). \] The paper gives the condition under which the above stochastic system has a global almost surely positive solution and provides an asymptotic pathwise estimation of the solution. In addition, the result shows that the solution of this stochastic system will converges to zero with probability one when the noise is large enough. This interesting result reveals that sufficiently large noise may make the population extinct.