Add to ORKGThe authors study scalar field theories for which the interaction term of the Hamiltonian is cubic in the fields. They indicate the circumstances for which field theory models of this type represent continuous phase transitions. The renormalisation group functions for these models are presented up to, and including, three-loop contributions, giving critical exponents to order epsilon 3in 6- epsilon dimensions. The exponent sigma which characterises the Yang-Lee edge singularity is given explicitly to this order
We continue the study, initiated in [L. Fei, S. Giombi, and I. R. Klebanov, Phys. Rev. D 90, 025018 ...
We study the chiral Ising, the chiral XY, and the chiral Heisenberg models at four-loop order with t...
Abstract We present a detailed version of our recent work on the RG approach to multicritical scalar...
The authors study scalar field theories for which the interaction term of the Hamiltonian is cubic i...
In this thesis we investigate the critical behaviour for systems whose symmetry permits trilinear (0...
We give details of a calculation of critical exponents for a class of field theory models that have ...
We determine the scaling properties of the Yang-Lee edge singularity as described by a one-component...
We explicitly compute the critical exponents associated with logarithmic corrections (the so-called ...
We investigate the critical properties of the Lee-Yang model in less than six spacetime dimensions u...
We renormalize six dimensional phi^3 theory in the modified minimal subtraction (MSbar) scheme at fo...
We use a regularized (ϕ2)2 field theory for the determination of the critical exponents γ and ν in t...
The constraints of conformal bootstrap are applied to investigate a set of conformal field theories ...
Lee-Yang zeros are points in the complex plane of an external control parameter at which the partiti...
The successful calculation of critical exponents for continuous phase transitions is one of the main...
23 pages, tex, private macros, one figureRenormalization group, and in particular its Quantum Field ...
We continue the study, initiated in [L. Fei, S. Giombi, and I. R. Klebanov, Phys. Rev. D 90, 025018 ...
We study the chiral Ising, the chiral XY, and the chiral Heisenberg models at four-loop order with t...
Abstract We present a detailed version of our recent work on the RG approach to multicritical scalar...
The authors study scalar field theories for which the interaction term of the Hamiltonian is cubic i...
In this thesis we investigate the critical behaviour for systems whose symmetry permits trilinear (0...
We give details of a calculation of critical exponents for a class of field theory models that have ...
We determine the scaling properties of the Yang-Lee edge singularity as described by a one-component...
We explicitly compute the critical exponents associated with logarithmic corrections (the so-called ...
We investigate the critical properties of the Lee-Yang model in less than six spacetime dimensions u...
We renormalize six dimensional phi^3 theory in the modified minimal subtraction (MSbar) scheme at fo...
We use a regularized (ϕ2)2 field theory for the determination of the critical exponents γ and ν in t...
The constraints of conformal bootstrap are applied to investigate a set of conformal field theories ...
Lee-Yang zeros are points in the complex plane of an external control parameter at which the partiti...
The successful calculation of critical exponents for continuous phase transitions is one of the main...
23 pages, tex, private macros, one figureRenormalization group, and in particular its Quantum Field ...
We continue the study, initiated in [L. Fei, S. Giombi, and I. R. Klebanov, Phys. Rev. D 90, 025018 ...
We study the chiral Ising, the chiral XY, and the chiral Heisenberg models at four-loop order with t...
Abstract We present a detailed version of our recent work on the RG approach to multicritical scalar...