Integrands of loop amplitudes within loop-tree duality
Abstract
Using loop-tree duality, we relate a renormalised n-point l-loop amplitude in a quantum field theory to a phase-space integral of a regularised l-fold forward limit of a UV-subtracted (n+2l)-point tree-amplitude-like object. We show that up to three loops the latter object is easily computable from recurrence relations. This defines an integrand of the loop amplitude with a global definition of the loop momenta. Field and mass renormalisation are performed in the on-shell scheme.
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