On non-proper intersections and local intersection numbers

Abstract

Given pure-dimensional (generalized) cycles μ1 and μ2 on a complex manifold Y we introduce a product μ1Y μ2 that is a generalized cycle whose multiplicities at each point are the local intersection numbers at the point. % If Y is projective, then given a very ample line bundle L Y we define a product μ1 μ2 whose multiplicities at each point also coincide with the local intersection numbers. In addition, provided that μ1 and μ2 are effective, this product satisfies a B\'ezout inequality. If i Y N is an embedding such that i*(1)=L, then μ1 μ2 can be expressed as a mean value of St\"uckrad-Vogel cycles on N. There are quite explicit relations between Y and .