Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

18.12 THE GAMMA FUNCTION AND RELATED FUNCTIONS


Γ( )

1 2


2


3 4


4


− (^2) − 1


− 2


− 4 − 3


− 4


− 6


6


n

n

Figure 18.9 The gamma function Γ(n).

Moreover, it may be shown for non-integralnthat the gamma function satisfies

the important identity


Γ(n)Γ(1−n)=

π
sinnπ

. (18.158)


This is proved for a restricted range ofnin the next section, once the beta


function has been introduced.


It can also be shown that the gamma function is given by

Γ(n+1)=


2 πn nne−n

(
1+

1
12 n

+

1
288 n^2


139
51 840n^3

+...

)
=n!,
(18.159)

which is known asStirling’s asymptotic series. For largenthe first term dominates,


and so


n!≈


2 πn nne−n; (18.160)

this is known asStirling’s approximation. This approximation is particularly useful


in statistical thermodynamics, when arrangements of a large number of particles


aretobeconsidered.


Prove Stirling’s approximationn!≈


2 πn nne−nfor largen.

From (18.153), the extended definition of the factorial function (which is valid forn>−1)
is given by


n!=

∫∞


0

xne−xdx=

∫∞


0

enlnx−xdx. (18.161)
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