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Tom Braden & Linda Chen & Frank Sottile |
Vol. 238 (2008), No. 2, 201-232 |
Abstract |
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We give a presentation for the (integral) torus-equivariant Chow ring of the quot scheme, a smooth compactification of the space of rational curves of degree d in the Grassmannian. For this presentation, we refine Evain’s extension of the method of Goresky, Kottwitz, and MacPherson to express the torus-equivariant Chow ring in terms of the torus-fixed points and explicit relations coming from the geometry of families of torus-invariant curves. As part of this calculation, we give a complete description of the torus-invariant curves on the quot scheme and show that each family is a product of projective spaces. |
Keywordsequivariant cohomology, Chow ring, quot scheme, Grassmannian |
Mathematical Subject ClassificationPrimary: 55N91, 14M15, 14F43, 14C05 |
Authors |
| Tom Braden |
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Department of Mathematics and Statistics Lederle Graduate Research Tower, Box 34515 University of Massachusetts Amherst Amherst, MA 01003-9305 United States |
| Linda Chen | |
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Department of Mathematics The Ohio State University 231 West 18th Avenue Columbus, OH 43210-1174 United States |
Department of Mathematics and Statistics Swarthmore College Swarthmore, PA 19081 United States |
| Frank Sottile |
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Department of Mathematics Texas A&M University College Station, TX 77843 United States |
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Berkeley, California.