Hal Schenck
Published 2011-01-01, updated 2011-07-03Version 2
For a toric variety X_P determined by a rational polyhedral fan P in a lattice N, Payne shows that the equivariant Chow cohomology of X_P is the Sym(N)--algebra C^0(P) of integral piecewise polynomial functions on P. We use the Cartan-Eilenberg spectral sequence to analyze the associated reflexive sheaf on Proj(N), showing that the Chern classes depend on subtle geometry of P and giving criteria for the splitting of the sheaf as a sum of line bundles. For certain fans associated to the reflection arrangement A_n, we describe a connection between C^0(P) and logarithmic vector fields tangent to A_n.
Comments: 11 pages 3 figures v2 references added, typos fixed
Journal: Transactions of the A.M.S., 364 (2012) 4041-4051
Equivariant Chow cohomology of toric varieties
Twisted forms of toric varieties
Cycle-level intersection theory for toric varieties
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