Diracδ-function 655Consider, next, aδ-function of the formδ(ax). This can be simplified according toδ(ax) =1
|a|
δ(x), (A.14)which also implies thatδ(−x) =δ(x). Similarly, aδ-function of the formδ(x^2 −a^2 )
can be rewritten equivalently as
δ(
x^2 −a^2)
=
1
2 |a|[δ(x−a) +δ(x+a)]. (A.15)More generally, given aδ-functionδ(g(x)) whereg(x) is a function withnzeroes at
points, ̄x 1 ,...,x ̄n, such thatg′( ̄xi) 6 = 0, theδ-function can be simplified according to
δ(g(x)) =∑ni=1δ(x−x ̄i)
|g′( ̄xi)|. (A.16)
It is easy to see that eqns. (A.14) and (A.15) are special cases of eqn. (A.16). Eqn.
(A.16) can also be proved usingδ-sequences by performing a change of variablesy=
g(x) and employing similar arguments to those used in proving eqn. (A.3).