Feynman integral in R1 Rm and complex expansion of 2F1
Abstract
Closed form expressions are proposed for the Feynman integral ID, m(p,q) = ∫dmy(2π)m∫dDx(2π)D 1(x-p/2)2+(y-q/2)4 1(x+p/2)2+(y+q/2)4 over d=D+m dimensional space with (x,y),\,(p,q)∈ RD Rm, in the special case D=1. We show that I1,m(p,q) can be expressed in different forms involving real and imaginary parts of the complex variable Gauss hypergeometric function 2F1, as well as generalized hypergeometric 2F2 and 3F2, Horn H4 and Appell F2 functions. Several interesting relations are derived between the real and imaginary parts of 2F1 and the function H4.
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