Complex slices on a real variety

Abstract

Let X be a real algebraic variety with set of complex points X C and set of real points X R. A complex slice of X is a transverse intersection of X R with a complex subvariety V of X C. Complex slices are real algebraic varieties of a very special kind. They are cooriented, realize an integer cohomology class. A codimension 2 projective variety is a slice, iff it is a base of pencil of real algebraic hypersurfaces. We prove an upper bound for the linking number of a real projective curve bounding in its complexification with a slice of codimension two.

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