Add to ORKG42 pages, 13 figuresThe Virasoro minimal models with boundary are described in the Landau-Ginzburg theory by introducing a boundary potential, function of the boundary field value. The ground state field configurations become non-trivial and are found to obey the soliton equations. The conformal invariant boundary conditions are characterized by the reparametrization-invariant data of the boundary potential, that are the number and degeneracies of the stationary points. The boundary renormalization group flows are obtained by varying the boundary potential while keeping the bulk critical: they satisfy new selection rules and correspond to real deformations of the Arnold simple singularities of A_k type. The description of conformal boundary...
We revisit the exact solution of the two space-time dimensional quantum field theory of a free massl...
I discuss recent work with Anatoly Konechny proving a gradient formula for the boundary beta functio...
A large class of two-dimensional $\mathcal{N}=(2,2)$ superconformal field theories can be understood...
The Virasoro minimal models with boundary are described in the Landau-Ginzburg theory by introducing...
Integrable boundary conditions are constructed for the critical A{D{E lat-tice models of statistical...
Conformally invariant boundary conditions for minimal models on a cylinder are classified by pairs o...
We consider unitary Virasoro minimal models on the disk with Cardy boundary conditions and discuss d...
The behaviour of boundary conditions under relevant bulk perturbations is studied for the Virasoro m...
9 pages, LaTeX2e. Invited talk by Christoph Schweigert at the TMR conference ``Non-perturbative quan...
This book is concerned with the study in two dimensions of stationary solutions of uɛ of a complex v...
Atkin M, Zohren S. FZZT Brane Relations in the Presence of Boundary Magnetic Fields. Journal of High...
The sl(2) minimal theories are classified by a Lie algebra pair where G is of A-D-E type. For these...
A free boundary problem is derived for type I superconductivity from Ginzburg-Landan theory in super...
Modern development of conformal field theory in two dimensions and its applications to critical phen...
International audienceWe study the conformal boundary conditions of the dilute O(n) model in two dim...
We revisit the exact solution of the two space-time dimensional quantum field theory of a free massl...
I discuss recent work with Anatoly Konechny proving a gradient formula for the boundary beta functio...
A large class of two-dimensional $\mathcal{N}=(2,2)$ superconformal field theories can be understood...
The Virasoro minimal models with boundary are described in the Landau-Ginzburg theory by introducing...
Integrable boundary conditions are constructed for the critical A{D{E lat-tice models of statistical...
Conformally invariant boundary conditions for minimal models on a cylinder are classified by pairs o...
We consider unitary Virasoro minimal models on the disk with Cardy boundary conditions and discuss d...
The behaviour of boundary conditions under relevant bulk perturbations is studied for the Virasoro m...
9 pages, LaTeX2e. Invited talk by Christoph Schweigert at the TMR conference ``Non-perturbative quan...
This book is concerned with the study in two dimensions of stationary solutions of uɛ of a complex v...
Atkin M, Zohren S. FZZT Brane Relations in the Presence of Boundary Magnetic Fields. Journal of High...
The sl(2) minimal theories are classified by a Lie algebra pair where G is of A-D-E type. For these...
A free boundary problem is derived for type I superconductivity from Ginzburg-Landan theory in super...
Modern development of conformal field theory in two dimensions and its applications to critical phen...
International audienceWe study the conformal boundary conditions of the dilute O(n) model in two dim...
We revisit the exact solution of the two space-time dimensional quantum field theory of a free massl...
I discuss recent work with Anatoly Konechny proving a gradient formula for the boundary beta functio...
A large class of two-dimensional $\mathcal{N}=(2,2)$ superconformal field theories can be understood...