%0 Journal Article %1 doi:10.1142/S0218127415501448 %A Llibre, Jaume %A Novaes, Douglas D. %A Teixeira, Marco A. %D 2015 %J International Journal of Bifurcation and Chaos %K myown published %N 11 %P 1550144 %R 10.1142/S0218127415501448 %T Limit Cycles Bifurcating from the Periodic Orbits of a Discontinuous Piecewise Linear Differentiable Center with Two Zones %U http://www.worldscientific.com/doi/abs/10.1142/S0218127415501448 %V 25 %X <p class="first last">We study a class of discontinuous piecewise linear differential systems with two zones separated by the straight line x = 0. In x &gt; 0, we have a linear saddle with its equilibrium point living in x &gt; 0, and in x &lt; 0 we have a linear differential center. Let p be the equilibrium point of this linear center, when p lives in x &lt; 0, we say that it is real, and when p lives in x &gt; 0 we say that it is virtual. We assume that this discontinuous piecewise linear differential system formed by the center and the saddle has a center q surrounded by periodic orbits ending in a homoclinic orbit of the saddle, independent if p is real, virtual or p is in x = 0. Note that q = p if p is real or p is in x = 0. We perturb these three classes of systems, according to the position of p, inside the class of all discontinuous piecewise linear differential systems with two zones separated by x = 0. Let N be the maximum number of limit cycles which can bifurcate from the periodic solutions of the center q with these perturbations. Our main results show that N = 2 when p is on x = 0, and N ≥ 2 when p is a real or virtual center. Furthermore, when p is a real center we found an example satisfying N ≥ 3.</p> </div>

@article{doi:10.1142/S0218127415501448, abstract = { <p class="first last">We study a class of discontinuous piecewise linear differential systems with two zones separated by the straight line x = 0. In x &gt; 0, we have a linear saddle with its equilibrium point living in x &gt; 0, and in x &lt; 0 we have a linear differential center. Let p be the equilibrium point of this linear center, when p lives in x &lt; 0, we say that it is real, and when p lives in x &gt; 0 we say that it is virtual. We assume that this discontinuous piecewise linear differential system formed by the center and the saddle has a center q surrounded by periodic orbits ending in a homoclinic orbit of the saddle, independent if p is real, virtual or p is in x = 0. Note that q = p if p is real or p is in x = 0. We perturb these three classes of systems, according to the position of p, inside the class of all discontinuous piecewise linear differential systems with two zones separated by x = 0. Let N be the maximum number of limit cycles which can bifurcate from the periodic solutions of the center q with these perturbations. Our main results show that N = 2 when p is on x = 0, and N ≥ 2 when p is a real or virtual center. Furthermore, when p is a real center we found an example satisfying N ≥ 3.</p> </div>}, added-at = {2015-12-28T06:19:24.000+0100}, author = {Llibre, Jaume and Novaes, Douglas D. and Teixeira, Marco A.}, biburl = {https://www.bibsonomy.org/bibtex/2247d121db85a72856b81ff681dedd867/ddnovaes}, doi = {10.1142/S0218127415501448}, eprint = {http://www.worldscientific.com/doi/pdf/10.1142/S0218127415501448}, interhash = {79606a56200d4da8dccc82cf46c2e959}, intrahash = {247d121db85a72856b81ff681dedd867}, journal = {International Journal of Bifurcation and Chaos}, keywords = {myown published}, number = 11, pages = 1550144, timestamp = {2015-12-28T06:19:24.000+0100}, title = {Limit Cycles Bifurcating from the Periodic Orbits of a Discontinuous Piecewise Linear Differentiable Center with Two Zones}, url = {http://www.worldscientific.com/doi/abs/10.1142/S0218127415501448}, volume = 25, year = 2015 }