Poincaré-Dulac normal form

Let ${\displaystyle X}$ be a ${\displaystyle C^{\infty }}$ vector field on ${\displaystyle \mathbb {R} ^{n}}$ with the origin as an equilibrium point; that is, ${\displaystyle X(0)=0}$. ${\displaystyle X(x(t))=x'(t)}$. Suppose also that ${\displaystyle x'=Ax+f(x)}$, where ${\displaystyle A}$ is linear and ${\displaystyle f(0)=0,D_{0}f=0}$. We would like to make our system as linear as possible, and ideally we would be able to do some change of coordinates to get ${\displaystyle y'=Ay}$, like how with the Morse lemma we can actually get rid of higher order terms around a nondegenerate critical point.

We define a vector ${\displaystyle \lambda =(\lambda _{1},\ldots ,\lambda _{n})\in \mathbb {R} ^{n}}$ to be resonant if there is some ${\displaystyle r=(r_{1},\ldots ,r_{n})\in \mathbb {Z} ^{n}}$ with all the ${\displaystyle r_{k}\geq 0}$ and with at least two of them nonzero. The order of the resonance is the ${\displaystyle l^{1}}$ norm of this integer vector: ${\displaystyle |r|=\sum r_{k}}$.

Poincar\'e's theorem on normal forms: If ${\displaystyle A}$ has ${\displaystyle n}$ distinct eigenvalues and they are nonresonant, there exists a formal change of variables ${\displaystyle x=y+O(|y|^{2})}$, transforming the equation ${\displaystyle x'=Ax+f(x)}$ to ${\displaystyle y'=Ay}$. The proof is given in Broer09.

The name Dulac is attached to the case when A has resonant eigenvalues. Then we can no longer push the nonlinearities off to infinity, but we can push most of them away, leaving only so-called resonant monomials.