Draft:Operational Chow ring: Difference between revisions

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			The basic question, still open as of, is whether there is a ]:
			:<math>A^(X) \to \operatorname{H}^(X, \mathbb{Z}</math>
			(If ''X'' is smooth, such a map exists since <math>A^*(X)</math> is the usual ] of ''X''.)

	== References ==		== References ==
	*W. Fulton, R. MacPherson, F. Sottile, and B. Sturmfels, ‘Intersection theory on spherical varieties’, J. Alg. Geom. 4 (1995), 181–193.		*W. Fulton, R. MacPherson, F. Sottile, and B. Sturmfels, ‘Intersection theory on spherical varieties’, J. Alg. Geom. 4 (1995), 181–193.

Revision as of 04:45, 4 November 2015

The basic question, still open as of, is whether there is a cycle map:

A^{*}(X)\to \operatorname {H} ^{*}(X,\mathbb {Z}

(If X is smooth, such a map exists since $A^{*}(X)$ is the usual Chow ring of X.)

W. Fulton, R. MacPherson, F. Sottile, and B. Sturmfels, ‘Intersection theory on spherical varieties’, J. Alg. Geom. 4 (1995), 181–193.

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