论生态动力学中的持久性和入侵物种

E. Sanchez-Palencia, J. Françoise
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引用次数: 1

摘要

. 物种持续存在的一般问题相当于它们之间确定的相互作用,以确保系统中最初存在的所有物种的生存。目前已有几种相关的持久性方案在拓扑结构中产生了零测度的“禁止集”。然而,这些特性(没有实际的结果)与持久性的某些数学定义不一致,这些定义有太多的限制。我们回到McGehee - Armstrong的定义和他们著名的反例,即所谓的“竞争排斥原则”。我们在一个相当实用和计算的框架中发展这些概念与物种的入侵特性有关。给出了无内部休息点(根据严格的持久性定义必须存在)的持久性群落的几个例子,并明确描述了吸引子、禁止集和入侵性质。给出了这些性质的污染机理(基于初等笛卡尔积和结构稳定性),显示了这些方案的广泛性质。
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On persistence and invading species in ecological dynamics
. The general problem of persistence of species, amounts to de fi ne interactions between them ensuring the survival of all the species initially present in the system. It appears that several relevant persistence schemes induce “forbidden sets” of zero measure for topological rea- sons. These peculiarities (without practical consequences) are nevertheless not consistent with certain mathematical de fi nitions of persistence, which are too much restrictive. We come back to de fi nitions of McGehee – Armstrong and their celebrated counter-example to the so-called “competitive exclusion principle”. We develop these concepts in relation with invasion properties of the species in a rather practical and computational framework. Several examples of communities exhibiting persistence without internal rest point (which necessarily exists according to strict persistence de fi nitions) are given, with explicit description of the attractors, forbidden sets and invasion properties. Mechanisms of contamination of these properties (based on elementary cartesian product and structural stability) are given, showing the widespreading nature of these schemes.
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