8*Sqrt[Pi/5]*x*\[Nu]*(1 + x*(-107/42 + (55*\[Nu])/42) + x^(3/2)*(2*Pi - 2*s - (2*\[Delta]*\[Sigma])/3) + x^(5/2)*((-107*Pi)/21 - (163*s)/63 - (\[Delta]*\[Sigma])/21 + \[Nu]*(-24*I + (34*Pi)/21 - (92*s)/63 + (20*\[Delta]*\[Sigma])/63)) + x^2*(-2173/1512 + 4*s^2 + (2047*\[Nu]^2)/1512 + 4*s*\[Delta]*\[Sigma] + \[Sigma]^2 + \[Nu]*(-1069/216 - 4*\[Sigma]^2)) + x^(7/2)*((-2173*Pi)/756 + (1061*s)/84 + 8*Pi*s^2 + (16*s^3)/3 + (3931*\[Delta]*\[Sigma])/756 + 8*Pi*s*\[Delta]*\[Sigma] + (32*s^2*\[Delta]*\[Sigma])/3 + 2*Pi*\[Sigma]^2 + (20*s*\[Sigma]^2)/3 + (4*\[Delta]*\[Sigma]^3)/3 + \[Nu]^2*((-4066*I)/945 + (40*Pi)/27 + (499*s)/84 + (1025*\[Delta]*\[Sigma])/252) + \[Nu]*((14333*I)/162 - (2495*Pi)/378 + (4043*s)/84 + (7813*\[Delta]*\[Sigma])/378 - 8*Pi*\[Sigma]^2 - (80*s*\[Sigma]^2)/3 - (16*\[Delta]*\[Sigma]^3)/3)) + x^3*(27027409/646800 - (856*EulerGamma)/105 + ((428*I)/105)*Pi + (2*Pi^2)/3 - ((4*I)/3)*s - 4*Pi*s - (71*s^2)/9 + (114635*\[Nu]^3)/99792 - (4*Pi*\[Delta]*\[Sigma])/3 - (739*s*\[Delta]*\[Sigma])/63 - (26*\[Sigma]^2)/7 + \[Nu]^2*(-20261/2772 - (136*\[Sigma]^2)/21) + \[Nu]*(-278185/33264 + (41*Pi^2)/96 + (136*s^2)/21 + (136*s*\[Delta]*\[Sigma])/21 + (347*\[Sigma]^2)/21) - (1712*Log[2])/105 - (428*Log[x])/105))
