Add to ORKGCFTs are naturally defined on Riemann surfaces. The rational ones can be solved using methods from algebraic geometry. One particular feature is the covariance of the partition function under the mapping class group. In genus g = 1, one can apply the standard theory of modular forms, which can be linked to ordinary differential equations of hypergeometric type
I explain a way to compute Fourier coefficients of modular forms associated to normalizer of non-spl...
We describe a numerical method to compute the action of Euclidean saddle points for the partition fu...
For a simplicial complex K, the de Rham algebra E*(K) is the differential graded algebra (DGA) of Q-...
The partition function of rational conformal field theories (CFTs) on Riemann surfaces is expected t...
In the (2, 5) minimal model, the partition function for genus g = 2 Riemann surfaces is expected to ...
The dependence of the Virasoro-N-point function on the moduli of the Riemann surface is investigated...
Within the framework of the ODE/IM correspondence, we show that the minimal conformal field theories...
Higher genus modular invariance of two-dimensional conformal field theories (CFTs) is a largely unex...
We survey some recents developments in the Minimal Model Program. After an elementary introduction t...
The following article reviews minimal models in conformal field theory (CFT). A two-dimensional CFT ...
I review a recently. developed procedure to classify all conformal field theories with a finite numb...
We develop a general method for deriving ordinary differential equations for the genus-two "characte...
Modular curves of the form X0(N) are intrinsically interesting curves to investigate. They contain a...
One of the main research programs in Algebraic Geometry is the classification of varieties. Towards ...
AbstractIn this paper, we first establish a second main theorem for algebraic curves into the n-dime...
I explain a way to compute Fourier coefficients of modular forms associated to normalizer of non-spl...
We describe a numerical method to compute the action of Euclidean saddle points for the partition fu...
For a simplicial complex K, the de Rham algebra E*(K) is the differential graded algebra (DGA) of Q-...
The partition function of rational conformal field theories (CFTs) on Riemann surfaces is expected t...
In the (2, 5) minimal model, the partition function for genus g = 2 Riemann surfaces is expected to ...
The dependence of the Virasoro-N-point function on the moduli of the Riemann surface is investigated...
Within the framework of the ODE/IM correspondence, we show that the minimal conformal field theories...
Higher genus modular invariance of two-dimensional conformal field theories (CFTs) is a largely unex...
We survey some recents developments in the Minimal Model Program. After an elementary introduction t...
The following article reviews minimal models in conformal field theory (CFT). A two-dimensional CFT ...
I review a recently. developed procedure to classify all conformal field theories with a finite numb...
We develop a general method for deriving ordinary differential equations for the genus-two "characte...
Modular curves of the form X0(N) are intrinsically interesting curves to investigate. They contain a...
One of the main research programs in Algebraic Geometry is the classification of varieties. Towards ...
AbstractIn this paper, we first establish a second main theorem for algebraic curves into the n-dime...
I explain a way to compute Fourier coefficients of modular forms associated to normalizer of non-spl...
We describe a numerical method to compute the action of Euclidean saddle points for the partition fu...
For a simplicial complex K, the de Rham algebra E*(K) is the differential graded algebra (DGA) of Q-...