Loop functions of sunset diagrams in 2+1 space-time dimensions
Abstract
In these notes the relativistic n-body phase-phase is calculated iteratively in 2+1 space-time dimensions for all n. The obtained result shows a simple power-law behavior αn (μ-M)n-2/μ with a dependence only on the total mass M=m1+… + mn. As a consequence of this feature, the (n-1)-loop integrals Jn(-q2) associated to sunset diagrams with n internal lines can be expressed through of elementary (arctangent and logarithmic) functions, modulo polynomial terms in q2 with regularization-dependent coefficients. An outlook to the analogous situation in 4+1 space-time dimensions is given by computing the n-body phase-phases for n=2,3,4,5 with their totally symmetric dependence on the involved masses. Moreover, a digression to 1+1 space-time dimensions reveals that there the three-body phase-space is already proportional to a complete elliptic integral.
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