Schröder functional equation
The equation
\begin{equation} \tag{a1} \phi ( f ( x ) ) = \lambda \phi ( x ), \end{equation}
where $\phi$ is the unknown function and $f ( x )$ is a known real-valued function of a real variable $x$. I.e. one asks for the eigenvalues and eigenfunctions of the composition operator (substitution operator) $\phi \mapsto \phi \circ f$. Sometimes $\lambda$ is allowed to be a function itself.
One also considers the non-autonomous Schröder functional equation
\begin{equation*} \phi ( f ( x ) ) = g ( x ) \phi ( x ) + h ( x ). \end{equation*}
The Schröder and Abel functional equations (see also Functional equation) have much to do with the translation functional equation
\begin{equation*} \phi ( \phi ( s , u ) , v ) = \phi ( s , u ^ { * } v ), \end{equation*}
\begin{equation*} s \in S , u , v \in H , \phi : S \times H \rightarrow S, \end{equation*}
where $H$ is a semi-group, which asks for something like a right action of $H$ on $S$, [a1], [a4].
The equation was formulated by E. Schröder, [a5], and there is an extensive body of literature.
References
[a1] | J. Aczél, "A short course on functional equations" , Reidel (1987) |
[a2] | M. Kuczma, "On the Schröder operator" , PWN (1963) |
[a3] | M. Kuczma, "Functional equations in a single variable" , PWN (1968) |
[a4] | G. Targonski, "Topics in iteration theory" , Vandenhoeck and Ruprecht (1981) pp. 82ff. |
[a5] | E. Schröder, "Uber iterierte Funktionen III" Math. Ann. , 3 (1970) pp. 296–322 |
[a6] | J. Walorski, "Convex solutions of the Schröder equation in Banach spaces" Proc. Amer. Math. Soc. , 125 (1997) pp. 153–158 |
Schröder functional equation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Schr%C3%B6der_functional_equation&oldid=50251