We provide a necessary and sufficient condition for permanence related to a local dynamical system on a suitable topological space. We then present an illustrative application to a Lotka\u2013Volterra predator\u2013prey model with intraspecific competition
A multitude of physical, chemical, or biological systems evolving in discrete time can be modelled a...
AbstractIn this paper, we first consider a general N-species nonautonomous Lotka–Volterra system. We...
AbstractThis paper considers permanence of a single-species dispersal periodic system with the possi...
Reaction-Diffusion systems are frequently used to model the population dynamics of interacting biolo...
We consider the permanence of a periodic predator-prey system, where the prey disperse in a two-patc...
Species experience both internal feedbacks with endogenous factors such as trait evolution and exter...
Abstract. Lotka-Volterra systems are the canonical ecological models used to analyze popula-tion dyn...
Species experience both internal feedbacks with endogenous factors such as trait evolution and exter...
AbstractThe main purpose of this article is considering whether or not the feedback controls have an...
AbstractA predator–prey model with a stage structure for the predator which improves the assumption ...
An elementary proof of permanence for a simple mathematical model proposed by Nowak and Bangham. In ...
AbstractConsider the permanence and global asymptotic stability of models governed by the following ...
AbstractIn this paper, a two-species competitive model with stage structure is presented and studied...
One of the important concept in population dynamics is finding conditions under which the population...
AbstractIn this paper, we consider a class of nonautonomous N-species Lotka–Volterra competitive sys...
A multitude of physical, chemical, or biological systems evolving in discrete time can be modelled a...
AbstractIn this paper, we first consider a general N-species nonautonomous Lotka–Volterra system. We...
AbstractThis paper considers permanence of a single-species dispersal periodic system with the possi...
Reaction-Diffusion systems are frequently used to model the population dynamics of interacting biolo...
We consider the permanence of a periodic predator-prey system, where the prey disperse in a two-patc...
Species experience both internal feedbacks with endogenous factors such as trait evolution and exter...
Abstract. Lotka-Volterra systems are the canonical ecological models used to analyze popula-tion dyn...
Species experience both internal feedbacks with endogenous factors such as trait evolution and exter...
AbstractThe main purpose of this article is considering whether or not the feedback controls have an...
AbstractA predator–prey model with a stage structure for the predator which improves the assumption ...
An elementary proof of permanence for a simple mathematical model proposed by Nowak and Bangham. In ...
AbstractConsider the permanence and global asymptotic stability of models governed by the following ...
AbstractIn this paper, a two-species competitive model with stage structure is presented and studied...
One of the important concept in population dynamics is finding conditions under which the population...
AbstractIn this paper, we consider a class of nonautonomous N-species Lotka–Volterra competitive sys...
A multitude of physical, chemical, or biological systems evolving in discrete time can be modelled a...
AbstractIn this paper, we first consider a general N-species nonautonomous Lotka–Volterra system. We...
AbstractThis paper considers permanence of a single-species dispersal periodic system with the possi...
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