On the arithmetic of rational hypersurfaces in toric varieties
Abstract
In the toric variety T, with Cox ring graded by (z2i)=(1,-1,0), (z2i+1)=(1,0,-1) and (w)=(0,1,0),(0,0,1), we study hypersurfaces X2n⊂ T of multidegree (2d+1,-d,-d) over a field k. These are the strict transforms of odd-degree hypersurfaces in P2n+1 with multiplicity d along two skew conjugate n-planes. We prove that X2n is k-rational and birational to P2n; and derive result on the distribution of its rational points over numbers and finite field. The case d=1 recovers the even-dimensional Fermat cubic.
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