In mathematics, E-functions are a type of power series that satisfy particular arithmetic conditions on the coefficients. They are of interest in transcendental number theory, and are closely related to G-functions.
Definition
editA power series with coefficients in the field of algebraic numbers
is called an E-function[1] if it satisfies the following three conditions:
- It is a solution of a non-zero linear differential equation with polynomial coefficients (this implies that all the coefficients cn belong to the same algebraic number field, K, which has finite degree over the rational numbers);
- For all ,
- where the left hand side represents the maximum of the absolute values of all the algebraic conjugates of cn;
- For all there is a sequence of natural numbers q0, q1, q2,... such that qnck is an algebraic integer in K for k = 0, 1, 2,..., n, and n = 0, 1, 2,... and for which
The second condition implies that f is an entire function of x.
Uses
editE-functions were first studied by Siegel in 1929.[2] He found a method to show that the values taken by certain E-functions were algebraically independent. This was a result which established the algebraic independence of classes of numbers rather than just linear independence.[3] Since then these functions have proved somewhat useful in number theory and in particular they have application in transcendence proofs and differential equations.[4]
The Siegel–Shidlovsky theorem
editPerhaps the main result connected to E-functions is the Siegel–Shidlovsky theorem (also known as the Siegel and Shidlovsky theorem), named after Carl Ludwig Siegel and Andrei Borisovich Shidlovsky.
Suppose that we are given n E-functions, E1(x),...,En(x), that satisfy a system of homogeneous linear differential equations
where the fij are rational functions of x, and the coefficients of each E and f are elements of an algebraic number field K. Then the theorem states that if E1(x),...,En(x) are algebraically independent over K(x), then for any non-zero algebraic number α that is not a pole of any of the fij the numbers E1(α),...,En(α) are algebraically independent.
Examples
edit- Any polynomial with algebraic coefficients is a simple example of an E-function.
- The exponential function is an E-function, in its case cn = 1 for all of the n.
- If λ is an algebraic number then the Bessel function Jλ is an E-function.
- The sum or product of two E-functions is an E-function. In particular E-functions form a ring.
- If a is an algebraic number and f(x) is an E-function then f(ax) will be an E-function.
- If f(x) is an E-function then the derivative and integral of f are also E-functions.
References
edit- ^ Carl Ludwig Siegel, Transcendental Numbers, p.33, Princeton University Press, 1949.
- ^ C.L. Siegel, Über einige Anwendungen diophantischer Approximationen, Abh. Preuss. Akad. Wiss. 1, 1929.
- ^ Alan Baker, Transcendental Number Theory, pp.109-112, Cambridge University Press, 1975.
- ^ Serge Lang, Introduction to Transcendental Numbers, pp.76-77, Addison-Wesley Publishing Company, 1966.