Normal forms for periodic systems

We study the following question: to what simplest normal form can a Hamiltonian with a symmetry group \(\Gamma\) be reduced by a \(\Gamma\)-equivariant contactomorphism (a contactomorphism conjugated with each transformation from \(\Gamma\) ). In particular, we point out conditions under which there

In 8 , the authors used normal form theory to construct Lyapunov functions for critical nonlinear systems in normal form coordinates. In this work, the authors expand on those ideas by providing a method for constructing the associated normal form transformations that gives rise to the systematic de

Many chemical reaction systems may be described by a system of ordinary differential equations. In general, a nonlinear change of variables is required to transform a system model to a much simpler equation called the normal form, which retains all important local nonlinear features of the system.