A study of zero-dimensional theories, based on exact results, is presented. First, relying on a simple diagrammatic representation of the theory, equations involving the generating function of all connected Green's functions are constructed. Second, exact solutions of these equations are obtained for several theories. Finally, renormalization is carried out. Based on the anticipated knowledge of the exact solutionsthe full dependence on the renormalized coupling constant is studied
The fields nonlinear modes quantization scheme is discussed. New form of the perturbation theory ach...
Let $F_g(t)$ be the generating function of intersection numbers on the moduli spaces $\overline{\mat...
The theory of resurgence connects high order terms of perturbative series to low order terms in non-...
We show how to use the Hopf algebra structure of quantum field theory to derive nonperturbative resu...
We solve the linear Dyson Schwinger equation for a massless vertex in Yukawa theory, iterating the f...
The Gell-Mann -- Low function \beta(g) in QED (g is the fine structure constant) is reconstructed. A...
Using Dyson--Schwinger equations within an approach developed by Broadhurst and Kreimer and the reno...
The development of the Exact Renormalization Group for fermionic theories is presented, together wit...
We provide a study of quantum chromodynamics with the technique of Dyson-Schwinger equations in diff...
Perturbative expansions in quantum field theory diverge for at least two reasons: the number of Feyn...
The problem of dynamical chiral symmetry breaking (DCSB) in multidimensional quantum electrodynamics...
Dyson-Schwinger-Gleichungen sind Fixpunktgleichungen, die in der Quantenfeldtheorie auftauchen. Obwo...
Arguments are provided which show that extension of renormalizability in quantum field theory is pos...
The advantageous points of ERG in applications to non-perturbative analyses of quantum field theorie...
This thesis is a contribution to the problem of extracting non-perturbative information from quantum...
The fields nonlinear modes quantization scheme is discussed. New form of the perturbation theory ach...
Let $F_g(t)$ be the generating function of intersection numbers on the moduli spaces $\overline{\mat...
The theory of resurgence connects high order terms of perturbative series to low order terms in non-...
We show how to use the Hopf algebra structure of quantum field theory to derive nonperturbative resu...
We solve the linear Dyson Schwinger equation for a massless vertex in Yukawa theory, iterating the f...
The Gell-Mann -- Low function \beta(g) in QED (g is the fine structure constant) is reconstructed. A...
Using Dyson--Schwinger equations within an approach developed by Broadhurst and Kreimer and the reno...
The development of the Exact Renormalization Group for fermionic theories is presented, together wit...
We provide a study of quantum chromodynamics with the technique of Dyson-Schwinger equations in diff...
Perturbative expansions in quantum field theory diverge for at least two reasons: the number of Feyn...
The problem of dynamical chiral symmetry breaking (DCSB) in multidimensional quantum electrodynamics...
Dyson-Schwinger-Gleichungen sind Fixpunktgleichungen, die in der Quantenfeldtheorie auftauchen. Obwo...
Arguments are provided which show that extension of renormalizability in quantum field theory is pos...
The advantageous points of ERG in applications to non-perturbative analyses of quantum field theorie...
This thesis is a contribution to the problem of extracting non-perturbative information from quantum...
The fields nonlinear modes quantization scheme is discussed. New form of the perturbation theory ach...
Let $F_g(t)$ be the generating function of intersection numbers on the moduli spaces $\overline{\mat...
The theory of resurgence connects high order terms of perturbative series to low order terms in non-...