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带一类时滞项的生物种群扩散模型的行波解
引用本文:黄海洋. 带一类时滞项的生物种群扩散模型的行波解[J]. 系统科学与数学, 1997, 17(2): 110-115
作者姓名:黄海洋
作者单位:北京师范大学数学系!北京,100875
摘    要:本文利用Schauder不动点理论证明了微分积分方程组行波解u(x,t)=U(z),w(x,t)=W(z),z=xγ-ct的存在性.这个方程组描述了一类在植物上繁殖,且靠飞行在空中扩散的生物种群扩散过程.特别当时滞项,中积分核K(t)(反映种群繁殖模式)属于L1(0,∞)时,本文得到极限值W(-∞)(表示最终植物上种群密度)小于M.这个结论较符合生物实际.

关 键 词:微分-积分方程组  行波解  时滞  种群扩散

THE TRAVELLING WAVE SOLUTION OF THE POPULATION DIFFUSION MODEL WITH A KIND OF DELAY
Hai Yang HUANG. THE TRAVELLING WAVE SOLUTION OF THE POPULATION DIFFUSION MODEL WITH A KIND OF DELAY[J]. Journal of Systems Science and Mathematical Sciences, 1997, 17(2): 110-115
Authors:Hai Yang HUANG
Affiliation:Department of Mathematics, Beijing Normal University 100875
Abstract:In this paper, the existence of the travelling wave solution $u(x,t)=U(z), w(x,t)=W(z),z=xgamma -ct$ of the following differentic-integral equations is confirmed by the schauderfixed point theory,$$begin{array}{l}u_t=DDelta u-delta u+{wover M}R_0int_{-infty}^{t}K(t-tau)w_tau d_tau,w_t=Edelta u(1-{wover M})+(1-{wover M})R_0int_{-infty}^{t}K(t-tau)w_tau d_tau,ugeq 0, 0leq w< M.end{array}$$These equations describe the diffusion of a biological population with breeding on the plant and diffusion by flight. For the case where in the delay term $R_0int_{-infty}^{t}K(t-tau)w_tau d_tau$ the kernel $K(t)$(the population breeding style) belongs to $L^1(0,infty)$, it is obained that the limit $W(-infty)$(final population density on the plant) is less than $M$. This conclusion is reasonable in bioloby.
Keywords:Differentio -integral equation   travelling wave solution   delay   populationdiffusion .
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