Add to ORKGA technique for center manifold reduction of nonlinear delay differential equations (DDEs) with time-periodic coefficients is presented. Perturbation expansion converts the nonlinear response problem into solutions of a series of non-homogenous linear ordinary differential equations (ODEs) with time periodic coefficients. One set of linear non-homogenous ODEs is solved for each power of the perturbation parameter. Each ODE is solved by a Chebyshev spectral collocation method. Thus we compute a finite approximation to the nonlinear infinite-dimensional map for the DDE. Center manifold reduction on the map is then carried out. Center manifold reduction is illustrated via a single inverted pendulum including both a periodic retarded follower f...
Whenever there is a time delay in a dynamical system, the study of stability becomes an infinite-dim...
Matsumoto and Szidarovszky (2011) examined a delayed continuous-time growth model with a special mou...
Whenever there is a time delay in a dynamical system, the study of stability becomes an infinite-dim...
A technique for center manifold reduction of nonlinear delay differential equations with time-period...
A technique for order reduction of nonlinear delay differential equations with time-periodic coeffic...
A technique for dimensional reduction of nonlinear delay differential equations with time-periodic c...
In this work, a differential delay equation (DDE) with a cubic nonlinearity is analyzed as...
Abstract. In this work, a differential delay equation (DDE) with a cubic nonlinearity is analyzed as...
We study small perturbations of three linear Delay Differential Equations (DDEs) close to Hopf bifur...
Thesis (M.S.) University of Alaska Fairbanks, 2003A technique for studying the transient response an...
Bifurcation theory has been very successful in the study of qualitative changes in nonlinear dynamic...
In this paper, we perform the parameter-dependent center manifold reduction near the generalized Hop...
AbstractThe purpose of this paper is to study the dynamic behavior of delay differential equations o...
Abstract: Approximate stability analysis of nonlinear delay differential algebraic equations (DDAEs)...
Smooth ordinary Delay Differential Equations (DDEs) appear in many applications, including neuroscie...
Whenever there is a time delay in a dynamical system, the study of stability becomes an infinite-dim...
Matsumoto and Szidarovszky (2011) examined a delayed continuous-time growth model with a special mou...
Whenever there is a time delay in a dynamical system, the study of stability becomes an infinite-dim...
A technique for center manifold reduction of nonlinear delay differential equations with time-period...
A technique for order reduction of nonlinear delay differential equations with time-periodic coeffic...
A technique for dimensional reduction of nonlinear delay differential equations with time-periodic c...
In this work, a differential delay equation (DDE) with a cubic nonlinearity is analyzed as...
Abstract. In this work, a differential delay equation (DDE) with a cubic nonlinearity is analyzed as...
We study small perturbations of three linear Delay Differential Equations (DDEs) close to Hopf bifur...
Thesis (M.S.) University of Alaska Fairbanks, 2003A technique for studying the transient response an...
Bifurcation theory has been very successful in the study of qualitative changes in nonlinear dynamic...
In this paper, we perform the parameter-dependent center manifold reduction near the generalized Hop...
AbstractThe purpose of this paper is to study the dynamic behavior of delay differential equations o...
Abstract: Approximate stability analysis of nonlinear delay differential algebraic equations (DDAEs)...
Smooth ordinary Delay Differential Equations (DDEs) appear in many applications, including neuroscie...
Whenever there is a time delay in a dynamical system, the study of stability becomes an infinite-dim...
Matsumoto and Szidarovszky (2011) examined a delayed continuous-time growth model with a special mou...
Whenever there is a time delay in a dynamical system, the study of stability becomes an infinite-dim...