Schröder's equation

Not to be confused with Schrödinger's equation.

Schröder's equation,^[1][2][3] named after Ernst Schröder, is a functional equation with one independent variable: given the function h, find the function Ψ such that

Ernst Schröder (1841–1902) in 1870 formulated his eponymous equation.

${\displaystyle \forall x\;\;\;\Psi {\big (}h(x){\big )}=s\Psi (x).}$

Schröder's equation is an eigenvalue equation for the composition operator C_h that sends a function f to f(h(.)).

If a is a fixed point of h, meaning h(a) = a, then either Ψ(a) = 0 (or ∞) or s = 1. Thus, provided that Ψ(a) is finite and Ψ′(a) does not vanish or diverge, the eigenvalue s is given by s = h′(a).

Functional significance

For a = 0, if h is analytic on the unit disk, fixes 0, and 0 < |h′(0)| < 1, then Gabriel Koenigs showed in 1884 that there is an analytic (non-trivial) Ψ satisfying Schröder's equation. This is one of the first steps in a long line of theorems fruitful for understanding composition operators on analytic function spaces, cf. Koenigs function.

Equations such as Schröder's are suitable to encoding self-similarity, and have thus been extensively utilized in studies of nonlinear dynamics (often referred to colloquially as chaos theory). It is also used in studies of turbulence, as well as the renormalization group.^[4][5]

An equivalent transpose form of Schröder's equation for the inverse Φ = Ψ⁻¹ of Schröder's conjugacy function is h(Φ(y)) = Φ(sy). The change of variables α(x) = log(Ψ(x))/log(s) (the Abel function) further converts Schröder's equation to the older Abel equation, α(h(x)) = α(x) + 1. Similarly, the change of variables Ψ(x) = log(φ(x)) converts Schröder's equation to Böttcher's equation, φ(h(x)) = (φ(x))^s.

Moreover, for the velocity,^[5] β(x) = Ψ/Ψ′,   Julia's equation,   β(f(x)) = f′(x)β(x), holds.

The n-th power of a solution of Schröder's equation provides a solution of Schröder's equation with eigenvalue sⁿ, instead. In the same vein, for an invertible solution Ψ(x) of Schröder's equation, the (non-invertible) function Ψ(x) k(log Ψ(x)) is also a solution, for any periodic function k(x) with period log(s). All solutions of Schröder's equation are related in this manner.

Solutions

Schröder's equation was solved analytically if a is an attracting (but not superattracting) fixed point, that is 0 < |h′(a)| < 1 by Gabriel Koenigs (1884).^[6][7]

In the case of a superattracting fixed point, |h′(a)| = 0, Schröder's equation is unwieldy, and had best be transformed to Böttcher's equation.^[8]

There are a good number of particular solutions dating back to Schröder's original 1870 paper.^[1]

The series expansion around a fixed point and the relevant convergence properties of the solution for the resulting orbit and its analyticity properties are cogently summarized by Szekeres.^[9] Several of the solutions are furnished in terms of asymptotic series, cf. Carleman matrix.

Applications

 

First five half periods of the phase-space orbit of the s = 4 chaotic logistic map h(x), interpolated holographically through Schröder's equation. The velocity v = dh_t/dt plotted against h_t. Chaos is evident in the orbit sweeping all xs at all times.

See also: Rational difference equation

It is used to analyse discrete dynamical systems by finding a new coordinate system in which the system (orbit) generated by h(x) looks simpler, a mere dilation.

More specifically, a system for which a discrete unit time step amounts to x → h(x), can have its smooth orbit (or flow) reconstructed from the solution of the above Schröder's equation, its conjugacy equation.

That is, h(x) = Ψ⁻¹(s Ψ(x)) ≡ h₁(x).

In general, all of its functional iterates (its regular iteration group, see iterated function) are provided by the orbit

${\displaystyle h_{t}(x)=\Psi ^{-1}{\big (}s^{t}\Psi (x){\big )},}$ 

for t real — not necessarily positive or integer. (Thus a full continuous group.) The set of h_n(x), i.e., of all positive integer iterates of h(x) (semigroup) is called the splinter (or Picard sequence) of h(x).

However, all iterates (fractional, infinitesimal, or negative) of h(x) are likewise specified through the coordinate transformation Ψ(x) determined to solve Schröder's equation: a holographic continuous interpolation of the initial discrete recursion x → h(x) has been constructed;^[10] in effect, the entire orbit.

For instance, the functional square root is h_1/2(x) = Ψ⁻¹(s^1/2 Ψ(x)), so that h_1/2(h_1/2(x)) = h(x), and so on.

For example,^[11] special cases of the logistic map such as the chaotic case h(x) = 4x(1 − x) were already worked out by Schröder in his original article^[1] (p. 306),

Ψ(x) = (arcsin √x)², s = 4, and hence h_t(x) = sin²(2^t arcsin √x).

In fact, this solution is seen to result as motion dictated by a sequence of switchback potentials,^[12] V(x) ∝ x(x − 1) (nπ + arcsin √x)², a generic feature of continuous iterates effected by Schröder's equation.

A nonchaotic case he also illustrated with his method, h(x) = 2x(1 − x), yields

Ψ(x) = −1/2ln(1 − 2x), and hence h_t(x) = −1/2((1 − 2x)^2t − 1).

Likewise, for the Beverton–Holt model, h(x) = x/(2 − x), one readily finds^[10] Ψ(x) = x/(1 − x), so that^[13]

${\displaystyle h_{t}(x)=\Psi ^{-1}{\big (}2^{-t}\Psi (x){\big )}={\frac {x}{2^{t}+x(1-2^{t})}}.}$ 

See also

• Böttcher's equation

References

1. Schröder, Ernst (1870). "Ueber iterirte Functionen". Math. Ann. 3 (2): 296–322. doi:10.1007/BF01443992.
2. Carleson, Lennart; Gamelin, Theodore W. (1993). Complex Dynamics. Textbook series: Universitext: Tracts in Mathematics. Springer-Verlag. ISBN 0-387-97942-5.
3. Kuczma, Marek (1968). Functional equations in a single variable. Monografie Matematyczne. Warszawa: PWN – Polish Scientific Publishers. ISBN 978-0-02-848110-4. OCLC 489667432.
4. Gell-Mann, M.; Low, F.E. (1954). "Quantum Electrodynamics at Small Distances" (PDF). Physical Review. 95 (5): 1300–1312. Bibcode:1954PhRv...95.1300G. doi:10.1103/PhysRev.95.1300.
5. Curtright, T.L.; Zachos, C.K. (March 2011). "Renormalization Group Functional Equations". Physical Review D. 83 (6): 065019. arXiv:1010.5174. Bibcode:2011PhRvD..83f5019C. doi:10.1103/PhysRevD.83.065019.
6. Koenigs, G. (1884). "Recherches sur les intégrales de certaines équations fonctionelles" (PDF). Annales Scientifiques de l'École Normale Supérieure. 1 (3, Supplément): 3–41. doi:10.24033/asens.247.
7. Erdős, Paul; Jabotinsky, Eri (1960). "On Analytic Iteration". Journal d'Analyse Mathématique. 8 (1): 361–376. doi:10.1007/BF02786856.
8. Böttcher, L. E. (1904). "The principal laws of convergence of iterates and their application to analysis". Izv. Kazan. Fiz.-Mat. Obshch. (Russian). 14: 155–234.
9. Szekeres, G. (1958). "Regular iteration of real and complex functions". Acta Mathematica. 100 (3–4): 361–376. doi:10.1007/BF02559539. [1]
10. Curtright, T.L.; Zachos, C. K. (2009). "Evolution Profiles and Functional Equations". Journal of Physics A. 42 (48): 485208. arXiv:0909.2424. Bibcode:2009JPhA...42V5208C. doi:10.1088/1751-8113/42/48/485208.
11. Curtright, T. L. Evolution surfaces and Schröder functional methods.
12. Curtright, T. L.; Zachos, C. K. (2010). "Chaotic Maps, Hamiltonian Flows, and Holographic Methods". Journal of Physics A. 43 (44): 445101. arXiv:1002.0104. Bibcode:2010JPhA...43R5101C. doi:10.1088/1751-8113/43/44/445101.
13. Skellam, J.G. (1951). "Random dispersal in theoretical populations". Biometrika. 38 (1–2): 196−218. doi:10.1093/biomet/38.1-2.196. JSTOR 2332328. See equations 41, 42.