A note on smooth SL2-surfaces
Abstract
Working over a field k of characteristic zero, we study the ring R=DZ2 where D=k[x0,x1,x2]/(2x0x2-x12-1) and Z2 acts by xi -xi. D admits an algebraic SL2(k)-action which restricts to R. Our results include the following. (1) If k is algebraically closed, the smooth SL2-surface X= Spec(R) admits an algebraic embedding in Ak4, and for any such embedding the SL2(k)-action on X does not extend to Ak4. In addition, there is no algebraic embedding of X in Ak3. (2) The automorphism group Autk(R) acts transitively on the set of irreducible locally nilpotent derivations of R. (3) Every automorphism of R extends to D, and Autk(R)=PSL2(k)HT where T is its triangular subgroup. (4) R is non-cancellative, i.e., there exists a ring S such that R[1]kS[1] but RkS. In order to distinguish R from S, we calculate the plinth invariant for R.
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