Abstract We study a class of universal Feynman integrals which appear in four-dimensional holomorphic theories. We recast the integrals as the Fourier transform of a certain polytope in the space of loop momenta (a.k.a. the “Operatope”). We derive a set of quadratic recursion relations which appear to fully determine the final answer. Our strategy can be applied to a very general class of twisted supersymmetric quantum field theories
Using the {\em cutting and sewing} procedure we show how to get Feynman diagrams, up to two-loop ord...
We construct a diagrammatic coaction acting on one-loop Feynman graphsand their cuts. The graphs are...
We present a new method for the momentum expansion of Feynman integrals with arbitrary masses and an...
N=4 supersymmetric Yang-Mills theory exhibits a rather surprising duality of Wilson-loop vacuum expe...
Abstract We derive analytic results for the symbol of certain two-loop Feynman integrals relevant fo...
31 pages, 5 figures. String-math 2013 proceeding contributionThis expository text is an invitation t...
We present a new method for the Taylor expansion of Feynman integrals with arbitrary masses and any ...
Feynman periods are Feynman integrals that do not depend on external kinematics. Their computation, ...
We study the problem of solving integration-by-parts recurrence relations for a given class of Feynm...
We propose a general coaction for families of integrals appearing in the evaluation of Feynman diagr...
International audienceWe construct a diagrammatic coaction acting on one-loop Feynman graphs and the...
In this document we present an overview of the analysis of the multiloop topologies that appear for ...
The free energy of a multicomponent scalar field theory is considered as a functional W[G,J] of the ...
We consider 4d N = 1 gauge theories with R-symmetry on a hemisphere times a torus. We apply localiza...
Using the {\em cutting and sewing} procedure we show how to get Feynman diagrams, up to two-loop ord...
We construct a diagrammatic coaction acting on one-loop Feynman graphsand their cuts. The graphs are...
We present a new method for the momentum expansion of Feynman integrals with arbitrary masses and an...
N=4 supersymmetric Yang-Mills theory exhibits a rather surprising duality of Wilson-loop vacuum expe...
Abstract We derive analytic results for the symbol of certain two-loop Feynman integrals relevant fo...
31 pages, 5 figures. String-math 2013 proceeding contributionThis expository text is an invitation t...
We present a new method for the Taylor expansion of Feynman integrals with arbitrary masses and any ...
Feynman periods are Feynman integrals that do not depend on external kinematics. Their computation, ...
We study the problem of solving integration-by-parts recurrence relations for a given class of Feynm...
We propose a general coaction for families of integrals appearing in the evaluation of Feynman diagr...
International audienceWe construct a diagrammatic coaction acting on one-loop Feynman graphs and the...
In this document we present an overview of the analysis of the multiloop topologies that appear for ...
The free energy of a multicomponent scalar field theory is considered as a functional W[G,J] of the ...
We consider 4d N = 1 gauge theories with R-symmetry on a hemisphere times a torus. We apply localiza...
Using the {\em cutting and sewing} procedure we show how to get Feynman diagrams, up to two-loop ord...
We construct a diagrammatic coaction acting on one-loop Feynman graphsand their cuts. The graphs are...
We present a new method for the momentum expansion of Feynman integrals with arbitrary masses and an...