Turán's theorem: Difference between revisions

28 year-old Painting Investments Worker Truman from Regina, usually spends time with pastimes for instance interior design, property developers in new launch ec Singapore and writing. Last month just traveled to City of the Renaissance. Template:Distinguish In mathematics, a generalized hypergeometric series is a power series in which the ratio of successive coefficients indexed by n is a rational function of n. The series, if convergent, defines a generalized hypergeometric function, which may then be defined over a wider domain of the argument by analytic continuation. The generalized hypergeometric series is sometimes just called the hypergeometric series, though this term also sometimes just refers to the Gaussian hypergeometric series. Generalized hypergeometric functions include the (Gaussian) hypergeometric function and the confluent hypergeometric function as special cases, which in turn have many particular special functions as special cases, such as elementary functions, Bessel functions, and the classical orthogonal polynomials.

Notation

A hypergeometric series is formally defined as a power series

${\displaystyle \beta _{0}+\beta _{1}z+\beta _{2}z^{2}+\dots =\sum _{n\geqslant 0}\beta _{n}z^{n}}$

in which the ratio of successive coefficients is a rational function of n. That is,

${\displaystyle {\frac {\beta _{n+1}}{\beta _{n}}}={\frac {A(n)}{B(n)}}}$

where A(n) and B(n) are polynomials in n.

For example, in the case of the series for the exponential function,

${\displaystyle 1+{\frac {z}{1!}}+{\frac {z^{2}}{2!}}+{\frac {z^{3}}{3!}}+\dots }$,

β_n = n!⁻¹ and β_n+1/β_n = 1/(n+1). So this satisfies the definition with A(n) = 1 and B(n) = n + 1.

It is customary to factor out the leading term, so β₀ is assumed to be 1. The polynomials can be factored into linear factors of the form (a_j + n) and (b_k + n) respectively, where the a_j and b_k are complex numbers.

For historical reasons, it is assumed that (1 + n) is a factor of B. If this is not already the case then both A and B can be multiplied by this factor; the factor cancels so the terms are unchanged and there is no loss of generality.

The ratio between consecutive coefficients now has the form

${\displaystyle {\frac {c(a_{1}+n)\dots (a_{p}+n)}{d(b_{1}+n)\dots (b_{q}+n)(1+n)}}}$,

where c and d are the leading coefficients of A and B. The series then has the form

${\displaystyle 1+{\frac {a_{1}\dots a_{p}}{b_{1}\dots b_{q}.1}}{\frac {cz}{d}}+{\frac {a_{1}\dots a_{p}}{b_{1}\dots b_{q}.1}}{\frac {(a_{1}+1)\dots (a_{p}+1)}{(b_{1}+1)\dots (b_{q}+1).2}}\left({\frac {cz}{d}}\right)^{2}+\dots }$,

or, by scaling z by the appropriate factor and rearranging,

${\displaystyle 1+{\frac {a_{1}\dots a_{p}}{b_{1}\dots b_{q}}}{\frac {z}{1!}}+{\frac {a_{1}(a_{1}+1)\dots a_{p}(a_{p}+1)}{b_{1}(b_{1}+1)\dots b_{q}(b_{q}+1)}}{\frac {z^{2}}{2!}}+\dots }$.

This has the form of an exponential generating function. The standard notation for this series is

${\displaystyle {}_{p}F_{q}(a_{1},\ldots ,a_{p};b_{1},\ldots ,b_{q};z)}$ or ${\displaystyle \,{}_{p}F_{q}\left[{\begin{matrix}a_{1}&a_{2}&\ldots &a_{p}\\b_{1}&b_{2}&\ldots &b_{q}\end{matrix}};z\right]}$

Using the rising factorial or Pochhammer symbol:

${\displaystyle {\begin{aligned}(a)_{0}&=1,\\(a)_{n}&=a(a+1)(a+2)...(a+n-1),&&n\geq 1\end{aligned}}}$

this can be written

${\displaystyle \,{}_{p}F_{q}(a_{1},\ldots ,a_{p};b_{1},\ldots ,b_{q};z)=\sum _{n=0}^{\infty }{\frac {(a_{1})_{n}\dots (a_{p})_{n}}{(b_{1})_{n}\dots (b_{q})_{n}}}\,{\frac {z^{n}}{n!}}}$

(Note that this use of the Pochhammer symbol is not standard, however it is the standard usage in this context.)

Special cases

Many of the special functions in mathematics are special cases of the confluent hypergeometric function or the hypergeometric function; see the corresponding articles for examples.

Some of the functions related to more complicated hypergeometric functions include:

• Dilogarithm:^[1]

${\displaystyle \operatorname {Li} _{2}(x)=\sum _{n>0}\,{x^{n}}{n^{-2}}=x\;{}_{3}F_{2}(1,1,1;2,2;x)}$

• Hahn polynomials:

${\displaystyle Q_{n}(x;a,b,N)={}_{3}F_{2}(-n,-x,n+a+b+1;a+1,-N+1;1).\ }$

• Wilson polynomials:

${\displaystyle p_{n}(t^{2})=(a+b)_{n}(a+c)_{n}(a+d)_{n}\;{}_{4}F_{3}\left({\begin{matrix}-n&a+b+c+d+n-1&a-t&a+t\\a+b&a+c&a+d\end{matrix}};1\right).}$

Terminology

When all the terms of the series are defined and it has a non-zero radius of convergence, then the series defines an analytic function. Such a function, and its analytic continuations, is called the hypergeometric function.

The case when the radius of convergence is 0 yields many interesting series in mathematics, for example the incomplete gamma function has the asymptotic expansion

${\displaystyle \Gamma (a,z)\sim z^{a-1}e^{-z}\left(1+{\frac {a-1}{z}}+{\frac {(a-1)(a-2)}{z^{2}}}\dots \right)}$

which could be written z^a−1e^−z ₂F₀(1−a,1;;−z⁻¹). However, the use of the term hypergeometric series is usually restricted to the case where the series defines an actual analytic function.

The ordinary hypergeometric series should not be confused with the basic hypergeometric series, which, despite its name, is a rather more complicated and recondite series. The "basic" series is the q-analog of the ordinary hypergeometric series. There are several such generalizations of the ordinary hypergeometric series, including the ones coming from zonal spherical functions on Riemannian symmetric spaces.

The series without the factor of n! in the denominator (summed over all integers n, including negative) is called the bilateral hypergeometric series.

Convergence conditions

There are certain values of the a_j and b_k for which the numerator or the denominator of the coefficients is 0.

• If any a_j is a non-positive integer (0, −1, −2, etc.) then the series only has a finite number of terms and is, in fact, a polynomial of degree −a_j.
• If any b_k is a non-positive integer (excepting the previous case with −b_k < a_j) then the denominators become 0 and the series is undefined.

Excluding these cases, the ratio test can be applied to determine the radius of convergence.

• If p < q + 1 then the ratio of coefficients tends to zero. This implies that the series converges for any finite value of z. An example is the power series for the exponential function.
• If p = q + 1 then the ratio of coefficients tends to one. This implies that the series converges for |z| < 1 and diverges for |z| > 1. Whether it converges for |z| = 1 is more difficult to determine. Analytic continuation can be employed for larger values of z.
• If p > q + 1 then the ratio of coefficients grows without bound. This implies that, besides z = 0, the series diverges. This is then a divergent or asymptotic series, or it can be interpreted as a symbolic shorthand for a differential equation that the sum satisfies.

The question of convergence for p=q+1 when z is on the unit circle is more difficult. It can be shown that the series converges absolutely at z = 1 if

${\displaystyle \Re \left(\sum b_{k}-\sum a_{j}\right)>0}$.

Further, if p=q+1, ${\displaystyle \sum _{i=1}^{p}a_{i}\geq \sum _{j=1}^{q}b_{j}}$ and z is real, then the following convergence result holds Template:Harv:

${\displaystyle \lim _{z\rightarrow 1}(1-z){\frac {d\log(_{p}F_{q}(a_{1},\ldots ,a_{p};b_{1},\ldots ,b_{q};z^{p}))}{dz}}=\sum _{i=1}^{p}a_{i}-\sum _{j=1}^{q}b_{j}}$.

Basic properties

It is immediate from the definition that the order of the parameters a_j, or the order of the parameters b_k can be changed without changing the value of the function. Also, if any of the parameters a_j is equal to any of the parameters b_k, then the matching parameters can be "cancelled out", with certain exceptions when the parameters are non-positive integers. For example,

${\displaystyle \,{}_{2}F_{1}(3,1;1;z)=\,{}_{2}F_{1}(1,3;1;z)=\,{}_{1}F_{0}(3;;z)}$.

Euler's integral transform

The following basic identity is very useful as it relates the higher-order hypergeometric functions in terms of integrals over the lower order ones

^[2]

${\displaystyle {}_{A+1}F_{B+1}\left[{\begin{array}{c}a_{1},\ldots ,a_{A},c\\b_{1},\ldots ,b_{B},d\end{array}};z\right]={\frac {\Gamma (d)}{\Gamma (c)\Gamma (d-c)}}\int _{0}^{1}t^{c-1}(1-t)_{}^{d-c-1}\ {}_{A}F_{B}\left[{\begin{array}{c}a_{1},\ldots ,a_{A}\\b_{1},\ldots ,b_{B}\end{array}};tz\right]dt}$

Differentiation

The generalized hypergeometric function satisfies

${\displaystyle {\begin{aligned}\left(z{\frac {\rm {d}}{{\rm {d}}z}}+a_{j}\right){}_{p}F_{q}\left[{\begin{array}{c}a_{1},\dots ,a_{j},\dots ,a_{p}\\b_{1},\dots ,b_{q}\end{array}};z\right]&=a_{j}\;{}_{p}F_{q}\left[{\begin{array}{c}a_{1},\dots ,a_{j}+1,\dots ,a_{p}\\b_{1},\dots ,b_{q}\end{array}};z\right]\\\left(z{\frac {\rm {d}}{{\rm {d}}z}}+b_{k}-1\right){}_{p}F_{q}\left[{\begin{array}{c}a_{1},\dots ,a_{p}\\b_{1},\dots ,b_{k},\dots ,b_{q}\end{array}};z\right]&=(b_{k}-1)\;{}_{p}F_{q}\left[{\begin{array}{c}a_{1},\dots ,a_{p}\\b_{1},\dots ,b_{k}-1,\dots ,b_{q}\end{array}};z\right]\\{\frac {\rm {d}}{{\rm {d}}z}}\;{}_{p}F_{q}\left[{\begin{array}{c}a_{1},\dots ,a_{p}\\b_{1},\dots ,b_{q}\end{array}};z\right]&={\frac {\prod _{i=1}^{p}a_{i}}{\prod _{j=1}^{q}b_{j}}}\;{}_{p}F_{q}\left[{\begin{array}{c}a_{1}+1,\dots ,a_{p}+1\\b_{1}+1,\dots ,b_{q}+1\end{array}};z\right]\end{aligned}}}$

Combining these gives a differential equation satisfied by w = _pF_q:

${\displaystyle z\prod _{n=1}^{p}\left(z{\frac {\rm {d}}{{\rm {d}}z}}+a_{n}\right)w=z{\frac {\rm {d}}{{\rm {d}}z}}\prod _{n=1}^{q}\left(z{\frac {\rm {d}}{{\rm {d}}z}}+b_{n}-1\right)w}$.

Contiguous function and related identities

Take the following operator:

${\displaystyle \vartheta =z{\frac {\rm {d}}{{\rm {d}}z}}.}$

From the differentiation formulas given above, the linear space spanned by

${\displaystyle {}_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{q};z),\vartheta \;{}_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{q};z)}$

contains each of

${\displaystyle {}_{p}F_{q}(a_{1},\dots ,a_{j}+1,\dots ,a_{p};b_{1},\dots ,b_{q};z),}$

${\displaystyle {}_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{k}-1,\dots ,b_{q};z),}$

${\displaystyle z\;{}_{p}F_{q}(a_{1}+1,\dots ,a_{p}+1;b_{1}+1,\dots ,b_{q}+1;z),}$

${\displaystyle {}_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{q};z).}$

Since the space has dimension 2, any three of these p+q+2 functions are linearly dependent. These dependencies can be written out to generate a large number of identities involving ${\displaystyle {}_{p}F_{q}}$.

For example, in the simplest non-trivial case,

${\displaystyle \;{}_{0}F_{1}(;a;z)=(1)\;{}_{0}F_{1}(;a;z)}$,

${\displaystyle \;{}_{0}F_{1}(;a-1;z)=({\frac {\vartheta }{a-1}}+1)\;{}_{0}F_{1}(;a;z)}$,

${\displaystyle z\;{}_{0}F_{1}(;a+1;z)=(a\vartheta )\;{}_{0}F_{1}(;a;z)}$,

So

${\displaystyle \;{}_{0}F_{1}(;a-1;z)-\;{}_{0}F_{1}(;a;z)={\frac {z}{a(a-1)}}\;{}_{0}F_{1}(;a+1;z)}$.

This, and other important examples,

${\displaystyle \;{}_{1}F_{1}(a+1;b;z)-\,{}_{1}F_{1}(a;b;z)={\frac {z}{b}}\;{}_{1}F_{1}(a+1;b+1;z)}$,

${\displaystyle \;{}_{1}F_{1}(a;b-1;z)-\,{}_{1}F_{1}(a;b;z)={\frac {az}{b(b-1)}}\;{}_{1}F_{1}(a+1;b+1;z)}$,

${\displaystyle \;{}_{1}F_{1}(a;b-1;z)-\,{}_{1}F_{1}(a+1;b;z)={\frac {(a-b+1)z}{b(b-1)}}\;{}_{1}F_{1}(a+1;b+1;z)}$

${\displaystyle \;{}_{2}F_{1}(a+1,b;c;z)-\,{}_{2}F_{1}(a,b;c;z)={\frac {bz}{c}}\;{}_{2}F_{1}(a+1,b+1;c+1;z)}$,

${\displaystyle \;{}_{2}F_{1}(a+1,b;c;z)-\,{}_{2}F_{1}(a,b+1;c;z)={\frac {(b-a)z}{c}}\;{}_{2}F_{1}(a+1,b+1;c+1;z)}$,

${\displaystyle \;{}_{2}F_{1}(a,b;c-1;z)-\,{}_{2}F_{1}(a+1,b;c;z)={\frac {(a-c+1)bz}{c(c-1)}}\;{}_{2}F_{1}(a+1,b+1;c+1;z)}$,

can be used to generate continued fraction expressions known as Gauss's continued fraction.

Similarly, by applying the differentiation formulas twice, there are ${\displaystyle {\binom {p+q+3}{2}}}$ such functions contained in

${\displaystyle \{1,\vartheta ,\vartheta ^{2}\}\;{}_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{q};z),}$

which has dimension three so any four are linearly dependent. This generates more identities and the process can be continued. The identities thus generated can be combined with each other to produce new ones in a different way.

A function obtained by adding ±1 to exactly one of the parameters a_j, b_k in

${\displaystyle {}_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{q};z)}$

is called contiguous to

${\displaystyle {}_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{q};z).}$

Using the technique outlined above, an identity relating ${\displaystyle {}_{0}F_{1}(;a;z)}$ and its two contiguous functions can be given, six identities relating ${\displaystyle {}_{1}F_{1}(a;b;z)}$ and any two of its four contiguous functions, and fifteen identities relating ${\displaystyle {}_{2}F_{1}(a,b;c;z)}$ and any two of its six contiguous functions have been found. (The first one was derived in the previous paragraph. The last fifteen were given by Gauss in his 1812 paper.)

Identities

28 year-old Painting Investments Worker Truman from Regina, usually spends time with pastimes for instance interior design, property developers in new launch ec Singapore and writing. Last month just traveled to City of the Renaissance. A number of other hypergeometric function identities were discovered in the nineteenth and twentieth centuries.

Saalschütz's theorem

Saalschütz's theorem^[3] Template:Harv is

${\displaystyle {}_{3}F_{2}(a,b,-n;c,1+a+b-c-n;1)={\frac {(c-a)_{n}(c-b)_{n}}{(c)_{n}(c-a-b)_{n}}}.}$

For extension of this theorem, see a research paper by Rakha & Rathie.

Dixon's identity

Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church.

Dixon's identity,^[4] first proved by Template:Harvtxt, gives the sum of a well-poised ₃F₂ at 1:

${\displaystyle {}_{3}F_{2}(a,b,c;1+a-b,1+a-c;1)={\frac {\Gamma (1+{\frac {a}{2}})\Gamma (1+{\frac {a}{2}}-b-c)\Gamma (1+a-b)\Gamma (1+a-c)}{\Gamma (1+a)\Gamma (1+a-b-c)\Gamma (1+{\frac {a}{2}}-b)\Gamma (1+{\frac {a}{2}}-c)}}.}$

For generalization of Dixon's identity, see a paper by Lavoie, et al.

Dougall's formula

Dougall's formula Template:Harvs gives the sum of a terminating well-poised series:

${\displaystyle {\begin{aligned}{}_{7}F_{6}&\left({\begin{matrix}a&1+{\frac {a}{2}}&b&c&d&e&-m\\&{\frac {a}{2}}&1+a-b&1+a-c&1+a-d&1+a-e&1+a+m\\\end{matrix}};1\right)=\\&={\frac {(1+a)_{m}(1+a-b-c)_{m}(1+a-c-d)_{m}(1+a-b-d)_{m}}{(1+a-b)_{m}(1+a-c)_{m}(1+a-d)_{m}(1+a-b-c-d)_{m}}}\end{aligned}}}$

provided that m is a non-negative integer (so that the series terminates) and

${\displaystyle 1+2a=b+c+d+e-m.}$

Many of the other formulas for special values of hypergeometric functions can be derived from this as special or limiting cases.

Generalization of Kummer's transformations and identities for ₂F₂

Identity 1.

${\displaystyle e^{-x}\;{}_{2}F_{2}(a,1+d;c,d;x)={}_{2}F_{2}(c-a-1,f+1;c,f;-x)}$

where

${\displaystyle f={\frac {d(a-c+1)}{a-d}}}$;

Identity 2.

${\displaystyle e^{-{\frac {x}{2}}}\,{}_{2}F_{2}\left(a,1+b;2a+1,b;x\right)={}_{0}F_{1}\left(;a+{\tfrac {1}{2}};{\tfrac {x^{2}}{16}}\right)-{\frac {x\left(1-{\tfrac {2a}{b}}\right)}{2(2a+1)}}\;{}_{0}F_{1}\left(;a+{\tfrac {3}{2}};{\tfrac {x^{2}}{16}}\right),}$

which links Bessel functions to ₂F₂; this reduces to Kummer's second formula for b = 2a:

Identity 3.

${\displaystyle e^{-{\frac {x}{2}}}\,{}_{1}F_{1}(a,2a,x)={}_{0}F_{1}\left(;a+{\tfrac {1}{2}};{\tfrac {x^{2}}{16}}\right)}$.

Identity 4.

${\displaystyle {\begin{aligned}{}_{2}F_{2}(a,b;c,d;x)=&\sum _{i=0}{\frac {{b-d \choose i}{a+i-1 \choose i}}{{c+i-1 \choose i}{d+i-1 \choose i}}}\;{}_{1}F_{1}(a+i;c+i;x){\frac {x^{i}}{i!}}\\=&e^{x}\sum _{i=0}{\frac {{b-d \choose i}{a+i-1 \choose i}}{{c+i-1 \choose i}{d+i-1 \choose i}}}\;{}_{1}F_{1}(c-a;c+i;-x){\frac {x^{i}}{i!}},\end{aligned}}}$

which is a finite sum if b-d is a non-negative integer.

Kummer's relation

Kummer's relation is

${\displaystyle {}_{2}F_{1}\left(2a,2b;a+b+{\tfrac {1}{2}};x\right)={}_{2}F_{1}\left(a,b;a+b+{\tfrac {1}{2}};4x(1-x)\right).}$

Clausen's formula

Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church. Clausen's formula

${\displaystyle {}_{3}F_{2}(2c-2s-1,2s,c-{\tfrac {1}{2}};2c-1,c;x)=\,{}_{2}F_{1}(c-s-{\tfrac {1}{2}},s;c;x)^{2}}$

was used by de Branges to prove the Bieberbach conjecture.

Special cases

The series ₀F₀

Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church. As noted earlier, ${\displaystyle {}_{0}F_{0}(;;z)=e^{z}}$. The differential equation for this function is ${\displaystyle {\frac {d}{dz}}w=w}$, which has solutions ${\displaystyle w=ke^{z}}$ where k is a constant.

The series ₁F₀

Also as noted earlier,

${\displaystyle {}_{1}F_{0}(a;;z)=(1-z)^{-a}.}$

The differential equation for this function is

${\displaystyle {\frac {d}{dz}}w=\left(z{\frac {d}{dz}}+a\right)w,}$

or

${\displaystyle (1-z){\frac {dw}{dz}}=aw,}$

which has solutions

${\displaystyle w=k(1-z)^{-a}}$

where k is a constant.

${\displaystyle {}_{1}F_{0}(1;;z)=(1-z)^{-1}}$ is the geometric series with ratio z and coefficient 1.

The series ₀F₁

The functions of the form ${\displaystyle {}_{0}F_{1}(;a;z)}$ are called confluent hypergeometric limit functions and are closely related to Bessel functions. The relationship is:

${\displaystyle J_{\alpha }(x)={\frac {({\tfrac {x}{2}})^{\alpha }}{\Gamma (\alpha +1)}}{}_{0}F_{1}\left(;\alpha +1;-{\tfrac {1}{4}}x^{2}\right).}$

The differential equation for this function is

${\displaystyle w=\left(z{\frac {d}{dz}}+a\right){\frac {dw}{dz}}}$

or

${\displaystyle z{\frac {d^{2}w}{dz^{2}}}+a{\frac {dw}{dz}}-w=0.}$

When a is not a positive integer, the substitution

${\displaystyle w=z^{1-a}u,}$

gives a linearly independent solution

${\displaystyle z^{1-a}\;{}_{0}F_{1}(;2-a;z),}$

so the general solution is

${\displaystyle k\;{}_{0}F_{1}(;a;z)+lz^{1-a}\;{}_{0}F_{1}(;2-a;z)}$

where k, l are constants. (If a is a positive integer, the independent solution is given by the appropriate Bessel function of the second kind.)

The series ₁F₁

Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church. The functions of the form ${\displaystyle {}_{1}F_{1}(a;b;z)}$ are called confluent hypergeometric functions of the first kind, also written ${\displaystyle M(a;b;z)}$. The incomplete gamma function ${\displaystyle \gamma (a,z)}$ is a special case.

The differential equation for this function is

${\displaystyle \left(z{\frac {d}{dz}}+a\right)w=\left(z{\frac {d}{dz}}+b\right){\frac {dw}{dz}}}$

or

${\displaystyle z{\frac {d^{2}w}{dz^{2}}}+(b-z){\frac {dw}{dz}}-aw=0.}$

When b is not a positive integer, the substitution

${\displaystyle w=z^{1-b}u,}$

gives a linearly independent solution

${\displaystyle z^{1-b}\;{}_{1}F_{1}(1+a-b;2-b;z),}$

so the general solution is

${\displaystyle k\;{}_{1}F_{1}(a;b;z)+lz^{1-b}\;{}_{1}F_{1}(1+a-b;2-b;z)}$