Affiliation:
1. IRMA UMR 7501 Strasbourg University Strasbourg France
2. Department of Mathematics Vanderbilt University Nashville Tennessee USA
3. Institute of Mathematics of the Romanian Academy Bucharest Romania
Abstract
AbstractWe give an expression for the Smith–Thom deficiency of the Hilbert square of a smooth real algebraic variety in terms of the rank of a suitable Mayer– Vietoris mapping in several situations. As a consequence, we establish a necessary and sufficient condition for the maximality of in the case of projective complete intersections, and show that with a few exceptions, no real nonsingular projective complete intersection of even dimension has maximal Hilbert square. We also provide new examples of smooth real algebraic varieties with maximal Hilbert square.