Add to ORKGFor an anisotropic euclidean phi^4 field theory with two interactions$[u (\sum_{i=1}^M {\phi}_i^2)^2+v \sum_{i=1}^M \phi_i^4]$the $\beta$-functions are calculated from five-loop perturbation expansionsin $d=4-\varepsilon$ dimensions,using the knowledge of the large-order behavior and Borel transformations.For $\varepsilon=1$, an infrared stable cubicfixed point for $M \geq 3$ is found,implying that the critical exponents in the magnetic phase transitionof real crystals are of the cubic universality class.There were previous indications of the stability based either onlower-loop expansions or on less reliable Pad\'{e} approximations,but only the evidence presented in this work seems to besufficently convincing to draw this conclusion
International audienceRenormalization group (RG) and resummation techniques have been used in N-comp...
Perturbation theory of a large class of scalar field theories in d < 4 can be shown to be Borel resu...
The effective potential for the local composite operator $\phi^{2}(x)$ in $\lambda \phi^{4}$-theory ...
For an anisotropic euclidean $\phi^4$-theory with two interactions $[u calculated from five-loop per...
For the anisotropic $[u (\sum_{i=1}^N {\phi}_i^2)^2+v \sum_{i=1}^N \phi_i^4]$ field theory with \mbo...
We discuss several examples of three-dimensional critical phenomena that can be described by Landau-...
We consider the Ginzburg-Landau Hamiltonian with a cubic-symmetric quartic interaction and compute t...
his book explains in detail how to perform perturbation expansions in quantum field theory to high...
We discuss several examples of three-dimensional critical phenomena that can be described by Landau...
In this work we perform a detailed numerical analysis of (1+1) dimensional lattice $\phi^4$ theory. ...
The six-loop expansions of the renormalization-group functions of φ4 n-vector model with cubic aniso...
We consider the Ginzburg-Landau Hamiltonian with a cubic-symmetric quartic interaction and compute ...
A tensorial representation of phi(4) field theory introduced by Herbut and Janssen [Phys. Rev. D 93,...
Abstract By considering the renormalization group flow between N coupled Ising models in the UV and ...
We consider the O(N)-symmetric phi(4) theory in two and three dimensions and determine the nonpertur...
International audienceRenormalization group (RG) and resummation techniques have been used in N-comp...
Perturbation theory of a large class of scalar field theories in d < 4 can be shown to be Borel resu...
The effective potential for the local composite operator $\phi^{2}(x)$ in $\lambda \phi^{4}$-theory ...
For an anisotropic euclidean $\phi^4$-theory with two interactions $[u calculated from five-loop per...
For the anisotropic $[u (\sum_{i=1}^N {\phi}_i^2)^2+v \sum_{i=1}^N \phi_i^4]$ field theory with \mbo...
We discuss several examples of three-dimensional critical phenomena that can be described by Landau-...
We consider the Ginzburg-Landau Hamiltonian with a cubic-symmetric quartic interaction and compute t...
his book explains in detail how to perform perturbation expansions in quantum field theory to high...
We discuss several examples of three-dimensional critical phenomena that can be described by Landau...
In this work we perform a detailed numerical analysis of (1+1) dimensional lattice $\phi^4$ theory. ...
The six-loop expansions of the renormalization-group functions of φ4 n-vector model with cubic aniso...
We consider the Ginzburg-Landau Hamiltonian with a cubic-symmetric quartic interaction and compute ...
A tensorial representation of phi(4) field theory introduced by Herbut and Janssen [Phys. Rev. D 93,...
Abstract By considering the renormalization group flow between N coupled Ising models in the UV and ...
We consider the O(N)-symmetric phi(4) theory in two and three dimensions and determine the nonpertur...
International audienceRenormalization group (RG) and resummation techniques have been used in N-comp...
Perturbation theory of a large class of scalar field theories in d < 4 can be shown to be Borel resu...
The effective potential for the local composite operator $\phi^{2}(x)$ in $\lambda \phi^{4}$-theory ...