Various perturbation series are factorially divergent. The behavior of their high-order terms can be found by Lipatov's method, according to which they are determined by the saddle-point configurations (instantons) of appropriate functional integrals. When the Lipatov asymptotics is known and several lowest order terms of the perturbation series are found by direct calculation of diagrams, one can gain insight into the behavior of the remaining terms of the series. Summing it, one can solve (in a certain approximation) various strong-coupling problems. This approach is demonstrated by determining the Gell-Mann - Low functions in \phi^4 theory, QED, and QCD for arbitrary coupling constants. An overview of the mathematical theory of divergent...
The author estimates the behaviour of the perturbation expansion and the epsilon expansion at large ...
We address the problem of ambiguity of a function determined by an asymptotic perturbation expansion...
A new procedure for the splitting of many-body Hamiltonians into 'free' and 'interaction' parts is p...
The mechanism underlying the divergence of perturbation theory is exposed. This is done through a de...
AbstractDivergent hypergeometric series 2F0(α,β;−1/ζ) occur frequently in Poincaré-type asymptotic e...
This review is focused on the borderline region of theoretical physics and mathematics. First, we de...
According to Lipatov, the high orders of perturbation theory are determinedby saddle-point configura...
This talk is concerned with two themes: how to obtain the large-order behavior of the divergent seri...
A new method which allows one to calculate the physical quantities represented by a ˇnite number of ...
doi:10.1088/0305-4470/37/35/011 We present a method for evaluating divergent series with factorially...
AbstractThis is the first in a series of articles on singular perturbation series in quantum mechani...
With the help of variational perturbation theory we continue the renormalization constants of f 4-th...
At the beginning of the second volume of his Méthodes nouvelles de la Mécanique Céleste Poincare ...
This review is focused on the borderline region of theoretical physics and mathematics. First, we de...
A pattern of partial resummation of perturbation theory series inspired by analytical continuation i...
The author estimates the behaviour of the perturbation expansion and the epsilon expansion at large ...
We address the problem of ambiguity of a function determined by an asymptotic perturbation expansion...
A new procedure for the splitting of many-body Hamiltonians into 'free' and 'interaction' parts is p...
The mechanism underlying the divergence of perturbation theory is exposed. This is done through a de...
AbstractDivergent hypergeometric series 2F0(α,β;−1/ζ) occur frequently in Poincaré-type asymptotic e...
This review is focused on the borderline region of theoretical physics and mathematics. First, we de...
According to Lipatov, the high orders of perturbation theory are determinedby saddle-point configura...
This talk is concerned with two themes: how to obtain the large-order behavior of the divergent seri...
A new method which allows one to calculate the physical quantities represented by a ˇnite number of ...
doi:10.1088/0305-4470/37/35/011 We present a method for evaluating divergent series with factorially...
AbstractThis is the first in a series of articles on singular perturbation series in quantum mechani...
With the help of variational perturbation theory we continue the renormalization constants of f 4-th...
At the beginning of the second volume of his Méthodes nouvelles de la Mécanique Céleste Poincare ...
This review is focused on the borderline region of theoretical physics and mathematics. First, we de...
A pattern of partial resummation of perturbation theory series inspired by analytical continuation i...
The author estimates the behaviour of the perturbation expansion and the epsilon expansion at large ...
We address the problem of ambiguity of a function determined by an asymptotic perturbation expansion...
A new procedure for the splitting of many-body Hamiltonians into 'free' and 'interaction' parts is p...