Abel equation

The Abel equation, named after Niels Henrik Abel, is a type of functional equation of the form

${\displaystyle f(h(x))=h(x+1)}$

or

${\displaystyle \alpha (f(x))=\alpha (x)+1}$.

The forms are equivalent when α is invertible. h or α control the iteration of f.

The second equation can be written

${\displaystyle {\alpha }^{-1}(\alpha (f(x)))={\alpha }^{-1}(\alpha (x)+1).}$

Taking x = α⁻¹(y), the equation can be written

${\displaystyle f({\alpha }^{-1}(y))={\alpha }^{-1}(y+1).}$

For a known function f(x) , a problem is to solve the functional equation for the function α⁻¹ ≡ h, possibly satisfying additional requirements, such as α⁻¹(0) = 1.

The change of variables s^α(x) = Ψ(x), for a real parameter s, brings Abel's equation into the celebrated Schröder's equation, Ψ(f(x)) = s Ψ(x) .

The further change F(x) = exp(s^α(x)) into Böttcher's equation, F(f(x)) = F(x)^s.

The Abel equation is a special case of (and easily generalizes to) the translation equation,^[1]

${\displaystyle \omega (\omega (x,u),v)=\omega (x,u+v),}$

e.g., for ${\displaystyle \omega (x,1)=f(x)}$,

${\displaystyle \omega (x,u)={\alpha }^{-1}(\alpha (x)+u)}$.     (Observe ω(x,0) = x.)

The Abel function α(x) further provides the canonical coordinate for Lie advective flows (one parameter Lie groups).

Initially, the equation in the more general form ^{[2] [3]} was reported. Even in the case of a single variable, the equation is non-trivial, and admits special analysis.^[4][5][6]

In the case of a linear transfer function, the solution is expressible compactly.^[7]

The equation of tetration is a special case of Abel's equation, with f = exp.

In the case of an integer argument, the equation encodes a recurrent procedure, e.g.,

${\displaystyle \alpha (f(f(x)))=\alpha (x)+2,}$

and so on,

${\displaystyle \alpha (f_n(x))=\alpha (x)+n.}$

The Abel equation has at least one solution on ${\displaystyle E}$ if and only if for all ${\displaystyle x\in E}$ and all ${\displaystyle n\in {\mathbb{N}}^{*}}$, ${\displaystyle f^n(x)\ne x}$, where ${\displaystyle f^n=f\circ f\circ \mathrm{...}\circ f}$, is the function f iterated n times.^[8]

We have the following existence and uniqueness theorem^{[9]: Theorem B}

Let ${\displaystyle h:ℝ\to ℝ}$ be analytic, meaning it has a Taylor expansion. To find: real analytic solutions ${\displaystyle \alpha :ℝ\to ℂ}$ of the Abel equation $\alpha \circ h=\alpha +1$.

A real analytic solution ${\displaystyle \alpha }$ exists if and only if both of the following conditions hold:

• ${\displaystyle h}$ has no fixed points, meaning there is no ${\displaystyle y\in ℝ}$ such that ${\displaystyle h(y)=y}$.
• The set of critical points of ${\displaystyle h}$, where ${\displaystyle h^{\prime }(y)=0}$, is bounded above if ${\displaystyle h(y)>y}$ for all ${\displaystyle y}$, or bounded below if ${\displaystyle h(y)<y}$ for all ${\displaystyle y}$.

The solution is essentially unique in the sense that there exists a canonical solution ${\displaystyle {\alpha }_0}$ with the following properties:

• The set of critical points of ${\displaystyle {\alpha }_0}$ is bounded above if ${\displaystyle h(y)>y}$ for all ${\displaystyle y}$, or bounded below if ${\displaystyle h(y)<y}$ for all ${\displaystyle y}$.
• This canonical solution generates all other solutions. Specifically, the set of all real analytic solutions is given by

$${\displaystyle \{{\alpha }_0+\beta \circ {\alpha }_0|\beta :ℝ\to ℝ\text{ is analytic, with period 1}\}.}$$

Analytic solutions (Fatou coordinates) can be approximated by asymptotic expansion of a function defined by power series in the sectors around a parabolic fixed point.^[10] The analytic solution is unique up to a constant.^[11]

• Functional equation
  • Schröder's equation
  • Böttcher's equation
• Infinite compositions of analytic functions
• Iterated function
• Shift operator
• Superfunction

• M. Kuczma, Functional Equations in a Single Variable, Polish Scientific Publishers, Warsaw (1968).
• M. Kuczma, Iterative Functional Equations. Vol. 1017. Cambridge University Press, 1990.