Hi Deema, (Having looked at and benefited from the comments so far I will take this answer in a slightly different direction). The subject is the integral above, not the multiple for loops that get you there. I'll neglect the (c/2)/sqrt(pi) factor in front.
If you set z = vu, dz = vdu and call the resulting function g, then the integral is
Int f(z) dz
= v^(L+1/2) * Int g(u) du
= v^(L+1/2) * Int exp(-u*(v+3/2)) .* u.^(L-1/2) ./ ((u+1).^n .* (u+1/2).^q) du
and a lot of the v dependence goes out in front. This integral is amenable to numerical integration. How far out you have to integrate depends on the constants but if n and q are >= 0, L <=10 and v is small, if you integrate from u = 0 to 40 for example, by then the integrand is down around e-10 at most and dropping quickly. Larger v and smaller L make things better.
The exception is when L = 0 (if it is an integer) or more generally if ( -1/2 < L < 1/2 ). Then the integrand is infinite at the origin, but still integrable. In that case you can take
h(u) = exp(-u*(v+3/2)).*u.^(L-1/2)
and do the integration as
Int g(u) du = Int (g(u)-h(u)) du + Int h(u) du
The first integral is good at the origin and is done numerically, although you may have to go in and insert the correct g(u)-h(u) = 0 at the origin since Matlab will probably come up with NaN there. The second integral has the analytic solution
Int h(u) du = ((v+3/2)^(-(L+1/2)))*gamma(L+1/2)
and the gamma function is available in Matlab.
