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Let K be a compact connected subset of cc, not reduced to a point, and F a univalent map in a neighborhood of K such that F(K) = K. This work presents a study and a classification of the dynamics of F in a neighborhood of K. When ℂ K has one or two connected components, it is proved that there is a natural rotation number associated with the dynamics. If this rotation number is irrational, the situation is close to that of “degenerate Siegel disks” or “degenerate Herman rings” studied by R. Pérez-Marco...
Six models of antiangiogenic therapy are compared and analyzed from control-theoretic point of view. All of them consist of a model of tumor growth bounded by the capacity of a vascular network developed by the tumor in the process of angiogenesis and different models of dynamics of this network, and are based on the idea proposed by Hahnfeldt et al. Moreover, we analyse optimal control problems resulting from their use in treatment protocol design.
We develop a stage-structured model that
describes the dynamics of two competing species each of which have sexual
and clonal reproduction. This is typical of many plants including irises.
We first analyze the dynamical behavior of a single species model. We show
that when the inherent net reproductive number is smaller than one then the
population will go to extinction and if it is larger than one then
an interior equilibrium exists and it is globally asymptotically
stable. Then we analyze...
The existence of non-Bernoullian actions with completely positive entropy is proved for a class of countable amenable groups which includes, in particular, a class of Abelian groups and groups with non-trivial finite subgroups. For this purpose, we apply a reverse version of the Rudolph-Weiss theorem.
We combine some results from the literature to give examples of completely mixing interval maps without limit measure.
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