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In mathematics, the E-function was introduced by to extend the
generalized hypergeometric series 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, whic ...
''p''''F''''q''(·) to the case ''p'' > ''q'' + 1. The underlying objective was to define a very general function that includes as particular cases the majority of the
special function Special functions are particular mathematical functions that have more or less established names and notations due to their importance in mathematical analysis, functional analysis, geometry, physics, or other applications. The term is defin ...
s known until then. However, this function had no great impact on the literature as it can always be expressed in terms of the
Meijer G-function In mathematics, the G-function was introduced by as a very general function intended to include most of the known special functions as particular cases. This was not the only attempt of its kind: the generalized hypergeometric function and the M ...
, while the opposite is not true, so that the G-function is of a still more general nature. It is defined as: E(p;\alpha_r;\rho_s;z)\equiv\frac\prod_^q\int_0^\infty\lambda_\mu^(\lambda_\mu+1)^d\lambda_\mu\prod_^\int_0^\infty\lambda_^\exp(-\lambda_)d\lambda_\int_0^\infty\lambda_p^\exp(-\lambda_)\left frac+1\right\lambda_p


Definition

There are several ways to define the MacRobert E-function; the following definition is in terms of the
generalized hypergeometric function 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, whic ...
: * when ''p'' ≤ ''q'' and ''x'' ≠ 0, or ''p'' = ''q'' + 1 and , ''x'', > 1: : E \!\left( \left. \begin \mathbf \\ \mathbf \end \; \ \, x \right) = \frac \;_F_ \!\left( \left. \begin \mathbf \\ \mathbf \end \; \ \, -x^ \right) * when ''p'' ≥ ''q'' + 2, or ''p'' = ''q'' + 1 and , ''x'', < 1: : E \!\left( \left. \begin \mathbf \\ \mathbf \end \; \ \, x \right) = \sum_^ \frac \Gamma (a_h) \; x^ \;_F_ \!\left( \left. \begin a_h, 1 + a_h - b_1, \dots, 1 + a_h - b_q \\ 1 + a_h - a_1, \dots, *, \dots, 1 + a_h - a_p \end \; \ \, (-1)^ \;x \right). The asterisks here remind us to ignore the contribution with index ''j'' = ''h'' as follows: In the product this amounts to replacing Γ(0) with 1, and in the argument of the hypergeometric function this amounts to shortening the vector length from ''p'' to ''p'' − 1. Evidently, this definition covers all values of ''p'' and ''q''.


Relationship with the Meijer G-function

The MacRobert E-function can always be expressed in terms of the
Meijer G-function In mathematics, the G-function was introduced by as a very general function intended to include most of the known special functions as particular cases. This was not the only attempt of its kind: the generalized hypergeometric function and the M ...
: : E \!\left( \left. \begin \mathbf \\ \mathbf \end \; \ \, x \right) = G_^ \!\left( \left. \begin 1, \mathbf \\ \mathbf \end \; \ \, x \right) where the parameter values are unrestricted, i.e. this relation holds without exception.


References

* * (see § 5.2, "Definition of the E-Function", p. 203) * * *


External links

* {{DEFAULTSORT:MacRobert E function Hypergeometric functions