D-affinity of Quadrics Revisited
Abstract
Let K be aa algebraically closed field of characteristic p≥3 and let Qn⊂Pn+1K be a smooth quadric hypersurface. We show that if n=2m≥4 then Qn is not D-affine. In particular, we show the grassmannian Gr(2,4) is not D-affine, which gives an example of a non D-affine flag variety of minimal possible dimension in characteristic p≥3. Our result complements previous work of A. Langer, who showed that if p≥ n=2m+1 then Qn is D-affine.
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