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x (£2 - y2)(£'2 - y'2) d£ dy d££ dy' where fm(£, £') [Eq. (201)] has been reduced to

f Pi(£')Qi(£) £>£' f (£,£') = (211) \Pi(£)Qi(£') £<£'

The integration over y and y' coordinates gives the result

r12 I

x (£ - £0)2(£' - £0)2fi(£, ££) x [£2£'2/2 - (£2 + £'2)I012 +122] d£ d£' (212)

where I0 and I2 are integrals which involve spherical Bessel functions. That is,

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