The Cox ring of a Del Pezzo surface
Abstract
Let Xr be a smooth Del Pezzo surface obtained from 2 by blowing up r ≤ 8 points in general position. It is well known that for r ∈ \3,4,5,6,7,8 \ the Picard group (Xr) contains a canonical root system Rr ∈ \A2 × A1, A4, D5, E6, E7, E8 \. We prove some general properties of the Cox ring of Xr (r ≥ 4) and show its similarity to the homogeneous coordinate ring of the orbit of the highest weight vector in some irreducible representation of the algebraic group G associated with the root system Rr.
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