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consider the plane cones $s=\langle(1,0),(1,n)\rangle$ and $t=\langle(1,0),(1,-n)\rangle$. This produce a toric variety obtained glueing $k[x,xy^n]$ and $k[x,xy^{-n}]$ along $k[x]$. There is a more "compact" way to see this variety as $k[u_1,\dots,u_n]/I$ for some ideal $I$.

Thanks

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    I'm not sure what the question is here. Could you clarify?2011-10-13

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