from application fulton
An affine normal toric variety given by a two-dimensional cone in two-dimensional space.
Properties relevant for the algebro-geometric side of CQS.
VERSAL_COMPONENTThe components of the versal deformation.
VERSAL_COMPONENTSThe continued fractions equivalent to zero that index the components of the versal deformation. See
> Jan Arthur Christophersen: On the components and discriminant of the versal base space of cyclic quotient singularities.
Properties defining a cyclic quotient singularity. Please be careful in checking the consistency if you give multiple input properties.
CONTINUED_FRACTIONRepresentation of the number n/q as a Hirzebruch-Jung continued fraction. Take care that this property agrees with the dual property.
DUAL_CONTINUED_FRACTIONRepresentation of the number n/(n-q) as a Hirzebruch-Jung continued fraction. Take care that this property agrees with the dual property.
NEvery cyclic quotient variety corresponds to a cone given by the rays (1,0) and (-q,n).
QEvery cyclic quotient variety corresponds to a cone given by the rays (1,0) and (-q,n).