Iterated function
In mathematics, an iterated function is a function X → X (that is, a function from some set X to itself) which is obtained by composing another function f : X → X with itself a certain number of times. The process of repeatedly applying the same function is called iteration. In this process, starting from some initial number, the result of applying a given function is fed again in the function as input, and this process is repeated.
Iterated functions are objects of study in computer science, fractals, dynamical systems, mathematics and renormalization group physics.
DefinitionEdit
The formal definition of an iterated function on a set X follows.
Let X be a set and f: X → X be a function.
Defining f ^{n} as the n-th iterate of f (a notation introduced by Hans Heinrich Bürmann^{[citation needed]}^{[1]}^{[2]} and John Frederick William Herschel^{[3]}^{[1]}^{[4]}^{[2]}), where n is a non-negative integer, by:
and
where id_{X} is the identity function on X and f○g denotes function composition. That is,
- (f○g)(x) = f (g(x)),
always associative.
Because the notation f ^{n} may refer to both iteration (composition) of the function f or exponentiation of the function f (the latter is commonly used in trigonometry), some mathematicians^{[citation needed]} choose to use ∘ to denote the compositional meaning, writing f^{∘n}(x) for the n-th iterate of the function f(x), as in, for example, f^{∘3}(x) meaning f(f(f(x))). For the same purpose, f^{[n]}(x) was used by Benjamin Peirce^{[5]}^{[2]} whereas Alfred Pringsheim and Jules Molk suggested ^{n}f(x) instead.^{[6]}^{[2]}^{[nb 1]}
Abelian property and iteration sequencesEdit
In general, the following identity holds for all non-negative integers m and n,
This is structurally identical to the property of exponentiation that a^{m}a^{n} = a^{m + n}, i.e. the special case f(x) = ax.
In general, for arbitrary general (negative, non-integer, etc.) indices m and n, this relation is called the translation functional equation, cf. Schröder's equation and Abel equation. On a logarithmic scale, this reduces to the nesting property of Chebyshev polynomials, T_{m}(T_{n}(x)) = T_{m n}(x), since T_{n}(x) = cos(n arcos(x )).
The relation (f^{ m} )^{n}(x) = (f^{ n} )^{m}(x) = f^{ mn}(x) also holds, analogous to the property of exponentiation that (a^{m} )^{n} = (a^{n} )^{m} = a^{mn}.
The sequence of functions f ^{n} is called a Picard sequence,^{[7]}^{[8]} named after Charles Émile Picard.
For a given x in X, the sequence of values f ^{n}(x) is called the orbit of x.
If f ^{n} (x) = f ^{n+m} (x) for some integer m, the orbit is called a periodic orbit. The smallest such value of m for a given x is called the period of the orbit. The point x itself is called a periodic point. The cycle detection problem in computer science is the algorithmic problem of finding the first periodic point in an orbit, and the period of the orbit.
Fixed pointsEdit
If f(x) = x for some x in X (that is, the period of the orbit of x is 1), then x is called a fixed point of the iterated sequence. The set of fixed points is often denoted as Fix(f ). There exist a number of fixed-point theorems that guarantee the existence of fixed points in various situations, including the Banach fixed point theorem and the Brouwer fixed point theorem.
There are several techniques for convergence acceleration of the sequences produced by fixed point iteration.^{[9]} For example, the Aitken method applied to an iterated fixed point is known as Steffensen's method, and produces quadratic convergence.
Limiting behaviourEdit
Upon iteration, one may find that there are sets that shrink and converge towards a single point. In such a case, the point that is converged to is known as an attractive fixed point. Conversely, iteration may give the appearance of points diverging away from a single point; this would be the case for an unstable fixed point.^{[10]} When the points of the orbit converge to one or more limits, the set of accumulation points of the orbit is known as the limit set or the ω-limit set.
The ideas of attraction and repulsion generalize similarly; one may categorize iterates into stable sets and unstable sets, according to the behaviour of small neighborhoods under iteration. (Also see Infinite compositions of analytic functions.)
Other limiting behaviours are possible; for example, wandering points are points that move away, and never come back even close to where they started.
Invariant measureEdit
If one considers the evolution of a density distribution, rather than that of individual point dynamics, then the limiting behavior is given by the invariant measure. It can be visualized as the behavior of a point-cloud or dust-cloud under repeated iteration. The invariant measure is an eigenstate of the Ruelle-Frobenius-Perron operator or transfer operator, corresponding to an eigenvalue of 1. Smaller eigenvalues correspond to unstable, decaying states.
In general, because repeated iteration corresponds to a shift, the transfer operator, and its adjoint, the Koopman operator can both be interpreted as shift operators action on a shift space. The theory of subshifts of finite type provides general insight into many iterated functions, especially those leading to chaos.
Fractional iterates and flows, and negative iteratesEdit
The notion f^{1/n} must be used with care when the equation g^{n}(x) = f(x) has multiple solutions, which is normally the case, as in Babbage's equation of the functional roots of the identity map. For example, for n = 2 and f(x) = 4x − 6, both g(x) = 6 − 2x and g(x) = 2x − 2 are solutions; so the expression f^{ ½}(x) doesn't denote a unique function, just as numbers have multiple algebraic roots. The issue is quite similar to the expression "0/0" in arithmetic. A trivial root of f can always be obtained if f's domain can be extended sufficiently, cf. picture. The roots chosen are normally the ones belonging to the orbit under study.
Fractional iteration of a function can be defined: for instance, a half iterate of a function f is a function g such that g(g(x)) = f(x).^{[11]} This function g(x) can be written using the index notation as f^{ ½}(x) . Similarly, f^{ ⅓}(x) is the function defined such that f^{⅓}(f^{⅓}(f^{⅓}(x))) = f(x), while f^{ ⅔}(x) may be defined as equal to f^{ ⅓}(f^{ ⅓}(x)), and so forth, all based on the principle, mentioned earlier, that f^{ m}○f^{ n} = f^{ m + n}. This idea can be generalized so that the iteration count n becomes a continuous parameter, a sort of continuous "time" of a continuous orbit.^{[12]}^{[13]}
In such cases, one refers to the system as a flow. (cf. Section on conjugacy below.)
Negative iterates correspond to function inverses and their compositions. For example, f^{ −1}(x) is the normal inverse of f, while f^{ −2}(x) is the inverse composed with itself, i.e. f^{ −2}(x) = f^{ −1}(f^{ −1}(x)). Fractional negative iterates are defined analogously to fractional positive ones; for example, f^{ −½}(x) is defined such that f^{ − ½}(f^{ −½}(x)) = f^{ −1}(x), or, equivalently, such that f^{ −½}(f^{ ½}(x)) = f^{ 0}(x) = x.
Some formulas for fractional iterationEdit
One of several methods of finding a series formula for fractional iteration, making use of a fixed point, is as follows.^{[14]}
- First determine a fixed point for the function such that f(a) = a .
- Define f ^{n}(a) = a for all n belonging to the reals. This, in some ways, is the most natural extra condition to place upon the fractional iterates.
- Expand f^{n}(x) around the fixed point a as a Taylor series,
- Expand out
- Substitute in for f ^{k}(a)= a, for any k,
- Make use of the geometric progression to simplify terms,
- There is a special case when f '(a) = 1,
This can be carried on indefinitely, although inefficiently, as the latter terms become increasingly complicated. A more systematic procedure is outlined in the following section on Conjugacy.
Example 1Edit
For example, setting f(x) = Cx + D gives the fixed point a = D/(1 − C), so the above formula terminates to just
which is trivial to check.
Example 2Edit
Find the value of where this is done n times (and possibly the interpolated values when n is not an integer). We have f(x) = √2^{x}. A fixed point is a = f(2) = 2.
So set x = 1 and f ^{n} (1) expanded around the fixed point value of 2 is then an infinite series,
which, taking just the first three terms, is correct to the first decimal place when n is positive—cf. Tetration: f ^{n}(1) = ^{n}√2 . (Using the other fixed point a = f(4) = 4 causes the series to diverge.)
For n = −1, the series computes the inverse function 2+ln x/ln 2.
Example 3Edit
With the function f(x) = x^{b}, expand around the fixed point 1 to get the series
which is simply the Taylor series of x^{(bn )} expanded around 1.
ConjugacyEdit
If f and g are two iterated functions, and there exists a homeomorphism h such that g = h^{−1} ○ f ○ h , then f and g are said to be topologically conjugate.
Clearly, topological conjugacy is preserved under iteration, as g^{n} = h^{−1} ○ f ^{n} ○ h. Thus, if one can solve for one iterated function system, one also has solutions for all topologically conjugate systems. For example, the tent map is topologically conjugate to the logistic map. As a special case, taking f(x) = x + 1, one has the iteration of g(x) = h^{−1}(h(x) + 1) as
- g^{n}(x) = h^{−1}(h(x) + n), for any function h.
Making the substitution x = h^{−1}(y) = ϕ(y) yields
- g(ϕ(y)) = ϕ(y+1), a form known as the Abel equation.
Even in the absence of a strict homeomorphism, near a fixed point, here taken to be at x = 0, f(0) = 0, one may often solve^{[15]} Schröder's equation for a function Ψ, which makes f(x) locally conjugate to a mere dilation, g(x) = f '(0) x, that is
- f(x) = Ψ^{−1}(f '(0) Ψ(x)).
Thus, its iteration orbit, or flow, under suitable provisions (e.g., f '(0) ≠ 1), amounts to the conjugate of the orbit of the monomial,
- Ψ^{−1}(f '(0)^{n} Ψ(x)),
where n in this expression serves as a plain exponent: functional iteration has been reduced to multiplication! Here, however, the exponent n no longer needs be integer or positive, and is a continuous "time" of evolution for the full orbit:^{[16]} the monoid of the Picard sequence (cf. transformation semigroup) has generalized to a full continuous group.^{[17]}
This method (perturbative determination of the principal eigenfunction Ψ, cf. Carleman matrix) is equivalent to the algorithm of the preceding section, albeit, in practice, more powerful and systematic.
Markov chainsEdit
If the function is linear and can be described by a stochastic matrix, that is, a matrix whose rows or columns sum to one, then the iterated system is known as a Markov chain.
ExamplesEdit
There are many chaotic maps. Well-known iterated functions include the Mandelbrot set and iterated function systems.
Ernst Schröder,^{[19]} in 1870, worked out special cases of the logistic map, such as the chaotic case f(x) = 4x(1 − x), so that Ψ(x) = arcsin^{2}(√x), hence f ^{n}(x) = sin^{2}(2^{n} arcsin(√x)).
A nonchaotic case Schröder also illustrated with his method, f(x) = 2x(1 − x), yielded Ψ(x) = −1/2 ln(1 − 2x), and hence f^{n}(x) = −1/2((1 − 2x)^{2n} − 1).
If f is the action of a group element on a set, then the iterated function corresponds to a free group.
Most functions do not have explicit general closed-form expressions for the n-th iterate. The table below lists some^{[19]} that do. Note that all these expressions are valid even for non-integer and negative n, as well as non-negative integer n.
(see note) |
where: |
(see note) |
where: |
(rational difference equation)^{[20]} | where: |
(generic Abel equation) | |
(Chebyshev polynomial for integer m) |
Note: these two special cases of ax^{2} + bx + c are the only cases that have a closed-form solution. Choosing b = 2 = –a and b = 4 = –a, respectively, further reduces them to the nonchaotic and chaotic logistic cases discussed prior to the table.
Some of these examples are related among themselves by simple conjugacies. A few further examples, essentially amounting to simple conjugacies of Schröder's examples can be found in ref.^{[21]}
Means of studyEdit
Iterated functions can be studied with the Artin–Mazur zeta function and with transfer operators.
In computer scienceEdit
In computer science, iterated functions occur as a special case of recursive functions, which in turn anchor the study of such broad topics as lambda calculus, or narrower ones, such as the denotational semantics of computer programs.
Definitions in terms of iterated functionsEdit
Two important functionals can be defined in terms of iterated functions. These are summation:
and the equivalent product:
Functional derivativeEdit
The functional derivative of an iterated function is given by the recursive formula:
Lie's data transport equationEdit
Iterated functions crop up in the series expansion of combined functions, such as g(f(x)).
Given the iteration velocity, or beta function (physics),
for the n^{th} iterate of the function f, we have^{[22]}
For example, for rigid advection, if f(x) = x + t, then v(x) = t. Consequently, g(x + t) = exp(t ∂/∂x) g(x), action by a plain shift operator.
Conversely, one may specify f(x) given an arbitrary v(x), through the generic Abel equation discussed above,
where
This is evident by noting that
For continuous iteration index t, then, now written as a subscript, this amounts to Lie's celebrated exponential realization of a continuous group,
The initial flow velocity v suffices to determine the entire flow, given this exponential realization which automatically provides the general solution to the translation functional equation,^{[23]}
See alsoEdit
NotesEdit
- ^ Alfred Pringsheim's and Jules Molk's (1907) notation ^{n}f(x) to denote function compositions must not be confused with Rudolf von Bitter Rucker's (1982) notation ^{n}x, introduced by Hans Maurer (1901) and Reuben Louis Goodstein (1947) for tetration, or with David Patterson Ellerman's (1995) ^{n}x pre-superscript notation for roots.
ReferencesEdit
- ^ ^{a} ^{b} Herschel, John Frederick William (1820). "Part III. Section I. Examples of the Direct Method of Differences". A Collection of Examples of the Applications of the Calculus of Finite Differences. Cambridge, UK: Printed by J. Smith, sold by J. Deighton & sons. pp. 1–13 [5–6]. Archived from the original on 2020-08-04. Retrieved 2020-08-04. [1] (NB. Inhere, Herschel refers to his 1813 work and mentions Hans Heinrich Bürmann's older work.)
- ^ ^{a} ^{b} ^{c} ^{d} Cajori, Florian (1952) [March 1929]. "§472. The power of a logarithm / §473. Iterated logarithms / §533. John Herschel's notation for inverse functions / §535. Persistence of rival notations for inverse functions / §537. Powers of trigonometric functions". A History of Mathematical Notations. 2 (3rd corrected printing of 1929 issue, 2nd ed.). Chicago, USA: Open court publishing company. pp. 108, 176–179, 336, 346. ISBN 978-1-60206-714-1. ISBN 1-60206-714-7. Retrieved 2016-01-18.
[…] §473. Iterated logarithms […] We note here the symbolism used by Pringsheim and Molk in their joint Encyclopédie article: "^{2}log_{b} a = log_{b} (log_{b} a), …, ^{k+1}log_{b} a = log_{b} (^{k}log_{b} a)."^{[a]} […] §533. John Herschel's notation for inverse functions, sin^{−1} x, tan^{−1} x, etc., was published by him in the Philosophical Transactions of London, for the year 1813. He says (p. 10): "This notation cos.^{−1} e must not be understood to signify 1/cos. e, but what is usually written thus, arc (cos.=e)." He admits that some authors use cos.^{m} A for (cos. A)^{m}, but he justifies his own notation by pointing out that since d^{2} x, Δ^{3} x, Σ^{2} x mean dd x, ΔΔΔ x, ΣΣ x, we ought to write sin.^{2} x for sin. sin. x, log.^{3} x for log. log. log. x. Just as we write d^{−n} V=∫^{n} V, we may write similarly sin.^{−1} x=arc (sin.=x), log.^{−1} x.=c^{x}. Some years later Herschel explained that in 1813 he used f^{n}(x), f^{−n}(x), sin.^{−1} x, etc., "as he then supposed for the first time. The work of a German Analyst, Burmann, has, however, within these few months come to his knowledge, in which the same is explained at a considerably earlier date. He[Burmann], however, does not seem to have noticed the convenience of applying this idea to the inverse functions tan^{−1}, etc., nor does he appear at all aware of the inverse calculus of functions to which it gives rise." Herschel adds, "The symmetry of this notation and above all the new and most extensive views it opens of the nature of analytical operations seem to authorize its universal adoption."^{[b]} […] §535. Persistence of rival notations for inverse function.— […] The use of Herschel's notation underwent a slight change in Benjamin Peirce's books, to remove the chief objection to them; Peirce wrote: "cos^{[−1]} x," "log^{[−1]} x."^{[c]} […] §537. Powers of trigonometric functions.—Three principal notations have been used to denote, say, the square of sin x, namely, (sin x)^{2}, sin x^{2}, sin^{2} x. The prevailing notation at present is sin^{2} x, though the first is least likely to be misinterpreted. In the case of sin^{2} x two interpretations suggest themselves; first, sin x · sin x; second,^{[d]} sin (sin x). As functions of the last type do not ordinarily present themselves, the danger of misinterpretation is very much less than in case of log^{2} x, where log x · log x and log (log x) are of frequent occurrence in analysis. […] The notation sin^{n} x for (sin x)^{n} has been widely used and is now the prevailing one. […]
(xviii+367+1 pages including 1 addenda page) (NB. ISBN and link for reprint of 2nd edition by Cosimo, Inc., New York, USA, 2013.) - ^ Herschel, John Frederick William (1813) [1812-11-12]. "On a Remarkable Application of Cotes's Theorem". Philosophical Transactions of the Royal Society of London. London: Royal Society of London, printed by W. Bulmer and Co., Cleveland-Row, St. James's, sold by G. and W. Nicol, Pall-Mall. 103 (Part 1): 8–26 [10]. JSTOR 107384.
- ^ Peano, Giuseppe (1903). Formulaire mathématique (in French). IV. p. 229.
- ^ Peirce, Benjamin (1852). Curves, Functions and Forces. I (new ed.). Boston, USA. p. 203.
- ^ Pringsheim, Alfred; Molk, Jules (1907). Encyclopédie des sciences mathématiques pures et appliquées (in French). I. p. 195. Part I.
- ^ Kuczma, Marek (1968). Functional equations in a single variable. Monografie Matematyczne. Warszawa: PWN – Polish Scientific Publishers.
- ^ Kuczma, M., Choczewski B., and Ger, R. (1990). Iterative Functional Equations. Cambridge University Press. ISBN 0-521-35561-3.
- ^ Carleson, L.; Gamelin, T. D. W. (1993). Complex dynamics. Universitext: Tracts in Mathematics. Springer-Verlag. ISBN 0-387-97942-5.
- ^ Istratescu, Vasile (1981). Fixed Point Theory, An Introduction, D. Reidel, Holland. ISBN 90-277-1224-7.
- ^ "Finding f such that f(f(x))=g(x) given g". MathOverflow.
- ^ Aldrovandi, R.; Freitas, L. P. (1998). "Continuous Iteration of Dynamical Maps". J. Math. Phys. 39 (10): 5324. arXiv:physics/9712026. Bibcode:1998JMP....39.5324A. doi:10.1063/1.532574. hdl:11449/65519.
- ^ Berkolaiko, G.; Rabinovich, S.; Havlin, S. (1998). "Analysis of Carleman Representation of Analytical Recursions". J. Math. Anal. Appl. 224: 81–90. doi:10.1006/jmaa.1998.5986.
- ^ "Tetration.org".
- ^ Kimura, Tosihusa (1971). "On the Iteration of Analytic Functions", Funkcialaj Ekvacioj 14, 197-238.
- ^ 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.
- ^ For explicit instance, example 2 above amounts to just f ^{n}(x) = Ψ^{−1}((ln 2)^{n} Ψ(x)), for any n, not necessarily integer, where Ψ is the solution of the relevant Schröder's equation, Ψ(√2^{x}) = ln 2 Ψ(x). This solution is also the infinite m limit of (f ^{m}(x) − 2)/(ln 2)^{m}.
- ^ Curtright, T. L. Evolution surfaces and Schröder functional methods.
- ^ ^{a} ^{b} Schröder, Ernst (1870). "Ueber iterirte Functionen". Math. Ann. 3 (2): 296–322. doi:10.1007/BF01443992.
- ^ Brand, Louis, "A sequence defined by a difference equation," American Mathematical Monthly 62, September 1955, 489–492. online
- ^ Katsura, S.; Fukuda, W. (1985). "Exactly solvable models showing chaotic behavior". Physica A: Statistical Mechanics and Its Applications. 130 (3): 597. Bibcode:1985PhyA..130..597K. doi:10.1016/0378-4371(85)90048-2.
- ^ Berkson, E.; Porta, H. (1978). "Semigroups of analytic functions and composition operators". The Michigan Mathematical Journal. 25: 101–115. doi:10.1307/mmj/1029002009. Curtright, T. L.; Zachos, C. K. (2010). "Chaotic maps, Hamiltonian flows and holographic methods". Journal of Physics A: Mathematical and Theoretical. 43 (44): 445101. arXiv:1002.0104. Bibcode:2010JPhA...43R5101C. doi:10.1088/1751-8113/43/44/445101.
- ^ Aczel, J. (2006), Lectures on Functional Equations and Their Applications (Dover Books on Mathematics, 2006), Ch. 6, ISBN 978-0486445236.