Geometry of autonomous discrete Painlev\'e equations related to the Weyl group W(E8(1))
Abstract
Discrete Painlev\'e equations are integrable two-dimensional birational maps associated to a family of generalized Halphen surfaces. The latter can be seen either as P2 blown up at nine points or as P1× P1 blown up at eight points. These maps become autonomous if the blow-up points are in a special position (support a pencil of cubic curves in P2, respectively a pencil of biquadratic curves in P1× P1), so that the generalized Halphen surfaces become rational elliptic surfaces. In the generic case, the symmetry of a discrete Painlev\'e equation is the Weyl group W(E8(1)). One has a system of commuting maps which correspond to translational elements of W(E8(1)) associated to the roots of the lattice E8(1). In the present note, we give a geometric construction of these commuting maps. For this, we use some novel birational involutions based on the above mentioned pencils of curves.
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