Add to ORKGWe strengthen the standard bifurcation theorems for saddle-node, transcritical, pitchfork, and period-doubling bifurcations of maps. Our new formulation involves adding one or two extra terms to the standard truncated normal forms with coefficients determined by algebraic equations. These extended normal forms are differentiably conjugate to the original maps on basins of attraction and repulsion of fixed points or periodic orbits. This reflects common assumptions about the additional information in normal forms despite standard bifurcation theorems being formulated only in terms of topological equivalence
Abstract We discuss the convergence problem for coordinate transformations which take a given vector...
In this paper we introduce the pseudo-normal form, which generalizes the notion of normal form aroun...
The inverted pendulum with a periodic parametric forcing is considered as a bifurcation problem in t...
Abstract: This paper investigates the dynamics and stability properties of a so-called planar trunca...
[EN] This paper is devoted to study the topological normal forms of families of maps on R which, und...
Further reduction for classical normal forms of smooth maps is considered in this paper. Firstly, ba...
Abstract. In this paper we derive explicit formulas for the normal form coefficients to verify the n...
\Ye present the quadratic and cubic normal forms of a nonlinear control system around an equilibrium...
We show that in the neighbourhood of relative equilibria and relative periodic solutions, coordinate...
We show that in the neighbourhood of relative equilibria and relative periodic solutions, coordinate...
Bifurcations of periodic orbits as an external parameter is varied are a characteristic feature of g...
Abstract. We discuss new and improved algorithms for the bifurcation analysis of fixed points and pe...
This thesis investigates some properties of discrete-time dynamical systems, generated by iterated m...
Abstract. We show that in the neighbourhood of relative equilibria and rel-ative periodic solutions,...
The theory of bifurcation from equilibria based on center-manifold reductio, and Poincare-Birkhoff n...
Abstract We discuss the convergence problem for coordinate transformations which take a given vector...
In this paper we introduce the pseudo-normal form, which generalizes the notion of normal form aroun...
The inverted pendulum with a periodic parametric forcing is considered as a bifurcation problem in t...
Abstract: This paper investigates the dynamics and stability properties of a so-called planar trunca...
[EN] This paper is devoted to study the topological normal forms of families of maps on R which, und...
Further reduction for classical normal forms of smooth maps is considered in this paper. Firstly, ba...
Abstract. In this paper we derive explicit formulas for the normal form coefficients to verify the n...
\Ye present the quadratic and cubic normal forms of a nonlinear control system around an equilibrium...
We show that in the neighbourhood of relative equilibria and relative periodic solutions, coordinate...
We show that in the neighbourhood of relative equilibria and relative periodic solutions, coordinate...
Bifurcations of periodic orbits as an external parameter is varied are a characteristic feature of g...
Abstract. We discuss new and improved algorithms for the bifurcation analysis of fixed points and pe...
This thesis investigates some properties of discrete-time dynamical systems, generated by iterated m...
Abstract. We show that in the neighbourhood of relative equilibria and rel-ative periodic solutions,...
The theory of bifurcation from equilibria based on center-manifold reductio, and Poincare-Birkhoff n...
Abstract We discuss the convergence problem for coordinate transformations which take a given vector...
In this paper we introduce the pseudo-normal form, which generalizes the notion of normal form aroun...
The inverted pendulum with a periodic parametric forcing is considered as a bifurcation problem in t...