2008
DOI: 10.1051/mmnp:2008068
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Competition of Species with Intra-Specific Competition

Abstract: Abstract. Intra-specific competition in population dynamics can be described by integro-differential equations where the integral term corresponds to nonlocal consumption of resources by individuals of the same population. Already the single integro-differential equation can show the emergence of nonhomogeneous in space stationary structures and can be used to model the process of speciation, in particular, the emergence of biological species during evolution [6], [7]. On the other hand, competition of two dif… Show more

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Cited by 33 publications
(43 citation statements)
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“…By virtue of a priori estimates obtained in this section we can use the Leray-Schauder method. As shown in [2], equation (2.6) with conditions (1.4) has a solution in the form of monotone travelling wave when τ = 0. This solution is unique up to translation in space.…”
Section: Proposition 1 Consider the Homotopy Defined In Section 22 mentioning
confidence: 99%
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“…By virtue of a priori estimates obtained in this section we can use the Leray-Schauder method. As shown in [2], equation (2.6) with conditions (1.4) has a solution in the form of monotone travelling wave when τ = 0. This solution is unique up to translation in space.…”
Section: Proposition 1 Consider the Homotopy Defined In Section 22 mentioning
confidence: 99%
“…In this case, the properties of the equation become quite different. It possesses an interesting nonlinear dynamics [4,8] but the wave existence can be proved only in the case of functions φ with a small support where the perturbation methods are applicable [1,2,3,5]. In this work we do not assume that the support is small.…”
Section: Theorem 1 There Exists a Monotone Travelling Wave That Is mentioning
confidence: 99%
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“…The proof of wave existence in the case of nonlocal equation becomes much more involved, and there are only partial results [2], [5], [6], [11], [15]. The notion of generalized travelling waves, which can be characterized as propagating solutions existing for all times from −∞ to ∞ [32], becomes appropriate here and allows the proof of wave existence without the assumption that the support of the kernel is sufficiently narrow [4], [11].…”
Section: Nonlocal Reaction-diffusion Equations In Population Dynamicsmentioning
confidence: 99%
“…Their structure and the patterns formed behind the waves can depend on their speed. Wave propagation is also studied in the multidimensional case [18] and for systems of equations [5], [8], [31].…”
Section: Nonlocal Reaction-diffusion Equations In Population Dynamicsmentioning
confidence: 99%