BilateralHypergeometricPFQ
BilateralHypergeometricPFQ[{a1,…,ap},{b1,…,bq},z]
is the bilateral hypergeometric function 
.
Details
- The bilateral hypergeometric series has a similar definition for its terms as the generalized hypergeometric series but sums over all integers, thus forming a doubly infinite series.
- Mathematical function, suitable for both symbolic and numerical manipulation.
has the series expansion ![sum_(k=-infty)^(infty)TemplateBox[{{a, _, 1}, k}, Pochhammer]...TemplateBox[{{a, _, p}, k}, Pochhammer]/TemplateBox[{{b, _, 1}, k}, Pochhammer]...TemplateBox[{{b, _, q}, k}, Pochhammer]z^k](Files/BilateralHypergeometricPFQ.en/3.png "sum_(k=-infty)^(infty)TemplateBox[{{a, _, 1}, k}, Pochhammer]...TemplateBox[{{a, _, p}, k}, Pochhammer]/TemplateBox[{{b, _, 1}, k}, Pochhammer]...TemplateBox[{{b, _, q}, k}, Pochhammer]z^k")
, where ![TemplateBox[{a, k}, Pochhammer]](Files/BilateralHypergeometricPFQ.en/4.png "TemplateBox[{a, k}, Pochhammer]")
is the Pochhammer symbol.- The bilateral hypergeometric series
is convergent if 
and 
. - The bilateral hypergeometric function
for the case when 
is calculated using Borel regularization. - None of the parameters
can be positive integers and none of the 
can be negative integers. - BilateralHypergeometricPFQ can be evaluated to arbitrary numerical precision.
- For certain special arguments, BilateralHypergeometricPFQ automatically evaluates to exact values.
- BilateralHypergeometricPFQ automatically threads over lists.
Examples
open allclose allBasic Examples (3)
Scope (18)
Numerical Evaluation (4)
The precision of the output tracks the precision of the input:
Evaluate for complex arguments and parameters:
Evaluate BilateralHypergeometricPFQ efficiently at high precision:
BilateralHypergeometricPFQ threads elementwise over lists in its third argument:
Specific Values (3)
BilateralHypergeometricPFQ automatically evaluates to simpler functions for certain parameters:
BilateralHypergeometricPFQ at 
:
BilateralHypergeometricPFQ at 
for the case 
:
Integration (2)
Differentiation (1)
The first derivative of a specific BilateralHypergeometricPFQ:
The 
th derivative of this BilateralHypergeometricPFQ:
Series Expansions (3)
Calculate the series expansion of BilateralHypergeometricPFQ at the origin:
Calculate the series expansion of BilateralHypergeometricPFQ at Infinity:
Calculate the series expansion of BilateralHypergeometricPFQ at a generic point:
Visualization (2)
Applications (1)
Compute doubly infinite sums via BilateralHypergeometricPFQ:
Properties & Relations (2)
BilateralHypergeometricPFQ may be written as a sum of two HypergeometricPFQ:
BilateralHypergeometricPFQ may simplify to elementary functions:
Possible Issues (1)
When 
, BilateralHypergeometricPFQ uses Borel regularization, which may be time-consuming:
Neat Examples (1)
BilateralHypergeometricPFQ may autosimplify to simpler special functions:
Text
Wolfram Research (2024), BilateralHypergeometricPFQ, Wolfram Language function, https://reference.wolfram.com/language/ref/BilateralHypergeometricPFQ.html.
CMS
Wolfram Language. 2024. "BilateralHypergeometricPFQ." Wolfram Language & System Documentation Center. Wolfram Research. https://reference.wolfram.com/language/ref/BilateralHypergeometricPFQ.html.
APA
Wolfram Language. (2024). BilateralHypergeometricPFQ. Wolfram Language & System Documentation Center. Retrieved from https://reference.wolfram.com/language/ref/BilateralHypergeometricPFQ.html