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graïments/Ajudes: The second author is partially supported by Fondecyt project 1130644.A zero-Hopf equilibrium is an isolated equilibrium point whose eigenvalues are ±ωi ̸= 0 and 0. For a such equilibrium there is no a general theory for knowing when from this equilibrium bifurcates a small-amplitude periodic orbit moving the parameters of the system. We provide here an algorithm for solving this problem. In particular, first we characterize the values of the parameters for which a zero-Hopf equilibrium point takes place in the Rössler systems, and we find two one-parameter families exhibiting such equilibria. After for one of these families we prove the existence of one periodic orbit bifurcating from the zero-Hopf equilibrium. The algorit...
In (Molaie et al., Int J Bifurcat Chaos 23 (2013) 1350188) the authors provided the expressions of t...
Agraïments/Ajudes: The first author is partially supported by PAPIIT (IN111410)We study the competit...
A zero-Hopf equilibrium of a differential system in R3 is an equilibrium point whose linear part has...
graïments/Ajudes: The second author is partially supported by Fondecyt project 1130644.A zero-Hopf e...
We study the zero-Hopf bifurcation of the Rössler differential system x· = x − xy − z, y· = x − ay, ...
We study the Hopf and the fold--Hopf bifurcations of the R\"ossler--type differential system * =-y-z...
Agraïments: All authors has been partially supported Conacyt México, grant 128790We apply the averag...
Recently sixteen 3-dimensional differential systems exhibiting chaotic motion and having no equilibr...
We study the zero-Hopf bifurcation of the third-order differential equations x″'+(a1x+a0)x″+(b1x+b0)...
Agraïments: The first author is supported by the FAPESP-BRAZIL grants 2010/18015-6, 2012/05635-1, an...
Here we study the Lotka-Volterra systems in R3, i.e. the differential systems of the form dxi/dt = x...
In this work we study the periodic orbits which bifurcate from all zero-Hopf bifurcations that an ar...
We use averaging theory for studying the Hopf and zero--Hopf bifurcations in some chaotic differenti...
Agraïments: FEDER-UNAB-10-4E-378. The first two authors are also supported by CAPES Grant Number 888...
We prove that the Volterra-Gause system of predator-prey type exhibits 2 kinds of zero-Hopf bifurcat...
In (Molaie et al., Int J Bifurcat Chaos 23 (2013) 1350188) the authors provided the expressions of t...
Agraïments/Ajudes: The first author is partially supported by PAPIIT (IN111410)We study the competit...
A zero-Hopf equilibrium of a differential system in R3 is an equilibrium point whose linear part has...
graïments/Ajudes: The second author is partially supported by Fondecyt project 1130644.A zero-Hopf e...
We study the zero-Hopf bifurcation of the Rössler differential system x· = x − xy − z, y· = x − ay, ...
We study the Hopf and the fold--Hopf bifurcations of the R\"ossler--type differential system * =-y-z...
Agraïments: All authors has been partially supported Conacyt México, grant 128790We apply the averag...
Recently sixteen 3-dimensional differential systems exhibiting chaotic motion and having no equilibr...
We study the zero-Hopf bifurcation of the third-order differential equations x″'+(a1x+a0)x″+(b1x+b0)...
Agraïments: The first author is supported by the FAPESP-BRAZIL grants 2010/18015-6, 2012/05635-1, an...
Here we study the Lotka-Volterra systems in R3, i.e. the differential systems of the form dxi/dt = x...
In this work we study the periodic orbits which bifurcate from all zero-Hopf bifurcations that an ar...
We use averaging theory for studying the Hopf and zero--Hopf bifurcations in some chaotic differenti...
Agraïments: FEDER-UNAB-10-4E-378. The first two authors are also supported by CAPES Grant Number 888...
We prove that the Volterra-Gause system of predator-prey type exhibits 2 kinds of zero-Hopf bifurcat...
In (Molaie et al., Int J Bifurcat Chaos 23 (2013) 1350188) the authors provided the expressions of t...
Agraïments/Ajudes: The first author is partially supported by PAPIIT (IN111410)We study the competit...
A zero-Hopf equilibrium of a differential system in R3 is an equilibrium point whose linear part has...
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