In this Thesis we discuss recent ideas concerning the evaluation of multi-loop Feynman Integrals in the context of Dimensional Regularization. In the first part we study relations fulfilled by Feynman Integrals, with a particular focus on Integration By Parts Identities (IBPs). We present the latter both in the standard momentum space representation, where we essentially we integrate a set of denominators over the loop momenta, and in Baikov representation, in which denominators are promoted to integration variables, and the Gram determinant of the whole set of loop and external momenta, referred to as Baikov Polynomial, emerges as a leading object. IBPs in Baikov representation naturally lead to the study and the implementation of...
Abstract We introduce the tools of intersection theory to the study of Feynman integrals, which allo...
Abstract The method of differential equations has been proven to be a powerful tool for the computat...
Abstract In recent years, differential equations have become the method of choice to compute multi-l...
In this thesis, we present a novel idea to address the evaluation of multi-loop Feynman integrals, i...
In this thesis we present modern techniques needed for the evaluation of one and multi loop amplitud...
Dimensionally-regulated Feynman integrals are a cornerstone of all perturbative computations in quan...
We present a proof that differential equations for Feynman loop integrals can always be derived in B...
We study the algebraic and analytic structure of Feynman integrals by proposing an operation that ma...
The method of canonical differential equations is an important tool in the calculation of Feynman in...
Abstract We develop a general framework for the evaluation of d-dimensional cut Feynman integrals ba...
Integration-by-parts identities between loop integrals arise from the vanishing integration of total...
We provide a comprehensive summary of concepts from Calabi-Yau motives relevant to the computation o...
In this thesis we present different topics in perturbation theory. We start by introducing the metho...
We present a new method for numerically computing generic multi-loop Feynman integrals. The method r...
We study Feynman integrals in the representation with Schwinger parameters and derive recursive inte...
Abstract We introduce the tools of intersection theory to the study of Feynman integrals, which allo...
Abstract The method of differential equations has been proven to be a powerful tool for the computat...
Abstract In recent years, differential equations have become the method of choice to compute multi-l...
In this thesis, we present a novel idea to address the evaluation of multi-loop Feynman integrals, i...
In this thesis we present modern techniques needed for the evaluation of one and multi loop amplitud...
Dimensionally-regulated Feynman integrals are a cornerstone of all perturbative computations in quan...
We present a proof that differential equations for Feynman loop integrals can always be derived in B...
We study the algebraic and analytic structure of Feynman integrals by proposing an operation that ma...
The method of canonical differential equations is an important tool in the calculation of Feynman in...
Abstract We develop a general framework for the evaluation of d-dimensional cut Feynman integrals ba...
Integration-by-parts identities between loop integrals arise from the vanishing integration of total...
We provide a comprehensive summary of concepts from Calabi-Yau motives relevant to the computation o...
In this thesis we present different topics in perturbation theory. We start by introducing the metho...
We present a new method for numerically computing generic multi-loop Feynman integrals. The method r...
We study Feynman integrals in the representation with Schwinger parameters and derive recursive inte...
Abstract We introduce the tools of intersection theory to the study of Feynman integrals, which allo...
Abstract The method of differential equations has been proven to be a powerful tool for the computat...
Abstract In recent years, differential equations have become the method of choice to compute multi-l...