Weighted projective space

In algebraic geometry, a weighted projective space P(a₀,...,a_n) is the projective variety Proj(k[x₀,...,x_n]) associated to the graded ring k[x₀,...,x_n] where the variable x_k has degree a_k.

Properties

• If d is a positive integer then P(a₀,a₁,...,a_n) is isomorphic to P(da₀,da₁,...,da_n). This is a property of the Proj construction; geometrically it corresponds to the d-tuple Veronese embedding. So without loss of generality one may assume that the degrees a_i have no common factor.
• Suppose that a₀,a₁,...,a_n have no common factor, and that d is a common factor of all the a_i with i≠j, then P(a₀,a₁,...,a_n) is isomorphic to P(a₀/d,...,a_j-1/d,a_j,a_j+1/d,...,a_n/d) (note that d is coprime to a_j; otherwise the isomorphism does not hold). So one may further assume that any set of n variables a_i have no common factor. In this case the weighted projective space is called well-formed.
• The only singularities of weighted projective space are cyclic quotient singularities.
• A weighted projective space is a Q-Fano variety^[1] and a toric variety.
• The weighted projective space P(a₀,a₁,...,a_n) is isomorphic to the quotient of projective space by the group that is the product of the groups of roots of unity of orders a₀,a₁,...,a_n acting diagonally.^[2]

References

• Dolgachev, Igor (1982), "Weighted projective varieties", Group actions and vector fields (Vancouver, B.C., 1981), Lecture Notes in Math., 956, Berlin: Springer, pp. 34–71, doi:10.1007/BFb0101508, ISBN 978-3-540-11946-3 
• Hosgood, Timothy (2016), An introduction to varieties in weighted projective space, Bibcode: 2016arXiv160402441H 
• Reid, Miles (2002), Graded rings and varieties in weighted projective space, https://homepages.warwick.ac.uk/~masda/surf/more/grad.pdf 

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