Titlebook: Intersection Theory; William Fulton Book 1998Latest edition Springer-Verlag Berlin Heidelberg 1998 Chern class.Division.Divisor.Equivalenc

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Intersection Products,.. Although the case of primary interest is when . is a closed imbedding, so . = .∩., there is significant benefit in allowing general morphisms . Let . be the induced morphism. The normal cone C..to . in . is a closed subcone of ..., of pure dimension . We define . to be the result of intersecting

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Families of Algebraic Cycles,ally equivalent . 1)-cycles on . determine rationally equivalent k-cycles in each fibre. The basic operations of intersection theory preserve algebraic families. For example, if . is smooth over ., and {α.} and {β.} are algebraic families of cycles, then the intersection products .. · .., also vary

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Dynamic Intersections, W, and .?. the normal cone to . in . In Chap. 6 the intersection class . in ..(.) has been constructed to be.where ....is the zero-section..If X . Y is imbedded in a family ... x . of regular imbeddings, with . a non-singular curve, 0 ∈ T, X. = ., and . ? . x . is a deformation of ., then there is

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