TY - JOUR
T1 - Dissipative solitons stabilized by nonlinear gradient terms
T2 - Time-dependent behavior and generic properties
AU - Descalzi, Orazio
AU - Carvalho, M. I.
AU - Facão, M.
AU - Brand, Helmut R.
N1 - Funding Information:
O.D. acknowledges the support of FONDECYT (CL), No. 1200357, and Universidad de los Andes through FAI initiatives. The work by M.I.C. and M.F. is financed by National Funds through the Portuguese funding agency, FCT—Fundação para a Ciência e a Tecnologia—within Project Nos. UIDB/50014/2020, UIDB/50025/2020, UIDP/50025/2020, and LA/P/0037/2020. H.R.B. acknowledges the Deutsche Forschungsgemeinschaft (DE) for partial support of this work.
Publisher Copyright:
© 2022 Author(s).
PY - 2022/12/1
Y1 - 2022/12/1
N2 - We study the time-dependent behavior of dissipative solitons (DSs) stabilized by nonlinear gradient terms. Two cases are investigated: first, the case of the presence of a Raman term, and second, the simultaneous presence of two nonlinear gradient terms, the Raman term and the dispersion of nonlinear gain. As possible types of time-dependence, we find a number of different possibilities including periodic behavior, quasi-periodic behavior, and also chaos. These different types of time-dependence are found to form quite frequently from a window structure of alternating behavior, for example, of periodic and quasi-periodic behaviors. To analyze the time dependence, we exploit extensively time series and Fourier transforms. We discuss in detail quantitatively the question whether all the DSs found for the cubic complex Ginzburg-Landau equation with nonlinear gradient terms are generic, meaning whether they are stable against structural perturbations, for example, to the additions of a small quintic perturbation as it arises naturally in an envelope equation framework. Finally, we examine to what extent it is possible to have different types of DSs for fixed parameter values in the equation by just varying the initial conditions, for example, by using narrow and high vs broad and low amplitudes. These results indicate an overlapping multi-basin structure in parameter space.
AB - We study the time-dependent behavior of dissipative solitons (DSs) stabilized by nonlinear gradient terms. Two cases are investigated: first, the case of the presence of a Raman term, and second, the simultaneous presence of two nonlinear gradient terms, the Raman term and the dispersion of nonlinear gain. As possible types of time-dependence, we find a number of different possibilities including periodic behavior, quasi-periodic behavior, and also chaos. These different types of time-dependence are found to form quite frequently from a window structure of alternating behavior, for example, of periodic and quasi-periodic behaviors. To analyze the time dependence, we exploit extensively time series and Fourier transforms. We discuss in detail quantitatively the question whether all the DSs found for the cubic complex Ginzburg-Landau equation with nonlinear gradient terms are generic, meaning whether they are stable against structural perturbations, for example, to the additions of a small quintic perturbation as it arises naturally in an envelope equation framework. Finally, we examine to what extent it is possible to have different types of DSs for fixed parameter values in the equation by just varying the initial conditions, for example, by using narrow and high vs broad and low amplitudes. These results indicate an overlapping multi-basin structure in parameter space.
KW - article
KW - case report
KW - clinical article
KW - Fourier transform
KW - time series analysis
UR - http://www.scopus.com/inward/record.url?scp=85144410090&partnerID=8YFLogxK
U2 - 10.1063/5.0118348
DO - 10.1063/5.0118348
M3 - Article
AN - SCOPUS:85144410090
SN - 1054-1500
VL - 32
JO - Chaos
JF - Chaos
IS - 12
M1 - 123107
ER -