Li–Yorke chaos in nonautonomous Hopf bifurcation patterns I

We prove that the subharmonic envelope of a lower semicontinu- ous function on Ω is harmonic on a certain open subset of Ω, using a very classical method in potential theory1.

As a consequence one obtains that the integral of any invariant measure in the space of pairs of planes extended to those meeting a compact convex set K is an infinite

The behaviour of u p in the case where the datum f is constant has been studied in [16] by Kawohl, where the author proved that under a suitable smallness assumption on the domain,

One sees that, in contrast to the inverse seesaw, in the linear seesaw case there is a lower bound on the neutrino- less double beta decay rate despite the fact that we have a

We propose that the whole myocardium is primed for coverage by epicardial cells but that heart morphology and associated flow patterns in the pericardial cavity expose certain

As a complement of the result proved in [15], we prove that if p > p ∗ , the existence of a solution for general measure data ν is not true and additional hypotheses on ν related

It is characteristic in such systems that the slightest variation of the initial conditions causes two identical chaotic systems to show trajectories that rapidly evolve

In the literature there is an absence of research data on a persons movement in his or her own house that is not biased by self-report or by third party observation. We are in