I analyze the algebraic patterns underlying the structure of scattering amplitudes in quantum field theory. I focus on the decomposition of amplitudes in terms of independent functions and the systems of differential equations the latter obey. In particular, I discuss the key role played by unitarity for the decomposition in terms of master integrals, by means of generalized cuts and integrand reduction, as well as for solving the corresponding differential equations, by means of Magnus exponential series
In this thesis, we present a novel idea to address the evaluation of multi-loop Feynman integrals, i...
The book focuses on advanced computer algebra methods and special functions that have striking appli...
A survey is given on the present status of analytic calculation methods and the mathematical structu...
I analyze the algebraic patterns underlying the structure of scattering amplitudes in quantum field ...
AbstractI analyze the algebraic patterns underlying the structure of scattering amplitudes in quantu...
The Les Houches theory wishlist contains many challenging multi-loop processes. An important technic...
Dimensionally-regulated Feynman integrals are a cornerstone of all perturbative computations in quan...
This volume comprises review papers presented at the Conference on Antidifferentiation and the Calcu...
In this thesis we discuss, within the framework of the Standard Model (SM) of particle physics, adva...
It is by now well established that, by means of the integration by part identities, all the integral...
The central impediment to reducing multidimensional integrals of transition amplitudes to analytic f...
none4siWe present the integrand reduction via multivariate polynomial division as a natural techniqu...
The problem of evaluating Feynman integrals over loop momenta has existed from the early days of per...
In perturbative calculations, e.g., in the setting of Quantum Chromodynamics (QCD) one aims at the e...
Scattering amplitudes in quantum field theory can be described as the probability of a scattering pr...
In this thesis, we present a novel idea to address the evaluation of multi-loop Feynman integrals, i...
The book focuses on advanced computer algebra methods and special functions that have striking appli...
A survey is given on the present status of analytic calculation methods and the mathematical structu...
I analyze the algebraic patterns underlying the structure of scattering amplitudes in quantum field ...
AbstractI analyze the algebraic patterns underlying the structure of scattering amplitudes in quantu...
The Les Houches theory wishlist contains many challenging multi-loop processes. An important technic...
Dimensionally-regulated Feynman integrals are a cornerstone of all perturbative computations in quan...
This volume comprises review papers presented at the Conference on Antidifferentiation and the Calcu...
In this thesis we discuss, within the framework of the Standard Model (SM) of particle physics, adva...
It is by now well established that, by means of the integration by part identities, all the integral...
The central impediment to reducing multidimensional integrals of transition amplitudes to analytic f...
none4siWe present the integrand reduction via multivariate polynomial division as a natural techniqu...
The problem of evaluating Feynman integrals over loop momenta has existed from the early days of per...
In perturbative calculations, e.g., in the setting of Quantum Chromodynamics (QCD) one aims at the e...
Scattering amplitudes in quantum field theory can be described as the probability of a scattering pr...
In this thesis, we present a novel idea to address the evaluation of multi-loop Feynman integrals, i...
The book focuses on advanced computer algebra methods and special functions that have striking appli...
A survey is given on the present status of analytic calculation methods and the mathematical structu...