RT Book, Section
T1 Hopf bifurcation and bifurcation from constant oscillations to a torus path for delayed complex Ginzburg-Landau equations
A1 Casal, Alfonso C.
A1 Díaz Díaz, Jesús Ildefonso
A1 Stich, Michael
A1 Vegas Montaner, José Manuel
A2 Pardo Llorente, Leandro
A2 Balakrishnan, Narayanaswamy
A2 Gil, María Ángeles
AB We consider the complex Ginzburg-Landau equation with feedback control given by some delayed linear terms (possibly dependent of the past spatial average of the solution). We prove several bifurcation results by using the delay as parameter. We start proving a Hopf bifurcation result for the equation without diffusion (the so-called Stuart-Landau equation) when the amplitude of the delayed term is suitably chosen. The diffusion case is considered first in the case of the whole space and later on a bounded domain with periodicity conditions. In the first case a linear stability analysis is made with the help of computational arguments (showing evidence of the fulfillment of the delicate transversality condition). In the last section the bifurcation takes place starting from an uniform oscillation and originates a path over a torus. This is obtained by the application of an abstract result over suitable functional spaces.
PB Springer
SN 978-3642208522
YR 2011
FD 2011
LK https://hdl.handle.net/20.500.14352/45557
UL https://hdl.handle.net/20.500.14352/45557
LA eng
NO Unión Europea. FP7
NO Comunidad Autónoma de Madrid
NO DGISPI (Spain)
NO Spanish MICIIN
NO UCM
NO MMNL from UPM
DS Docta Complutense
RD 10 abr 2025