Symmetry defect of n-dimensional complete intersections in C2n-1
Abstract
Let X, Y ⊂ C2n-1 be n-dimensional strong complete intersections in a general position. In this note, we consider the set of midpoints of chords connecting a point x ∈ X to a point y ∈ Y. This set is defined as the image of the map (x,y)=x+y2. Under geometric conditions on X and Y, we prove that the symmetry defect of X and Y, which is the bifurcation set B(X,Y) of the mapping , is an algebraic variety, characterized by a topological invariant. We introduce a hypersurface that approximates the set B(X,Y) and we present an estimate for its degree. Moreover, for any two n-dimensional strong complete intersections X,Y⊂ C2n-1 (including the case X=Y) we introduce a generic symmetry defect set B(X,Y) of X and Y, which is defined up to homeomorphism.
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