由递归系统建模的生物生长与扩散。I. 数学理论。
Biological growth and spread modeled by systems of recursions. I. Mathematical theory.
作者信息
Lui R
出版信息
Math Biosci. 1989 Apr;93(2):269-95. doi: 10.1016/0025-5564(89)90026-6.
We study the asymptotic behavior of solutions to a system of recursions u in+1 = Qi[mu n], i = 1, ..., k. The vector operator Q has the origin theta and a positive vector beta as fixed points and is defined for vector-valued functions bounded between theta and gamma where gamma greater than or equal to beta. In addition, Q is order-preserving, commutes with translation, and is continuous in the topology of uniform convergence on compact subsets. Let theta less than or equal to pi much less than beta, and suppose that for all pi much less than alpha much less than beta, Q(n) alpha]----beta as n----infinity. If u0 much greater than pi on a sufficiently large ball and has bounded support, then un propagates with a speed c*(xi) in the direction of the unit vector xi as n----infinity. In certain cases, c*(xi) can be calculated explicitly. The results generalize those of a scalar equation studied by Weinberger.
我们研究递推系统(u_{n + 1} = Q_i[\mu_n]),(i = 1, \ldots, k)的解的渐近行为。向量算子(Q)以原点(\theta)和正向量(\beta)作为不动点,并且对于在(\theta)和(\gamma)之间有界的向量值函数有定义,其中(\gamma\geq\beta)。此外,(Q)是保序的,与平移可交换,并且在紧子集上一致收敛的拓扑中是连续的。设(\theta\leq\pi\ll\beta),并且假设对于所有(\pi\ll\alpha\ll\beta),当(n\to\infty)时(Q(n)\alpha\to\beta)。如果(u_0)在足够大的球上远大于(\pi)且具有有界支撑,那么当(n\to\infty)时,(u_n)以速度(c^(\xi))沿单位向量(\xi)的方向传播。在某些情况下,(c^(\xi))可以明确计算出来。这些结果推广了Weinberger研究的一个标量方程的结果。
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