Exponential rarefaction of maximal real algebraic hypersurfaces

Abstract

Given an ample real Hermitian holomorphic line bundle L over a real algebraic variety X, the space of real holomorphic sections of L d inherits a natural Gaussian probability measure. We prove that the probability that the zero locus of a real holomorphic section s of L d defines a maximal hypersurface tends to 0 exponentially fast as d goes to infinity. This extends to any dimension a result of Gayet and Welschinger valid for maximal real algebraic curves inside a real algebraic surface. The starting point is a low degree approximation property which relates the topology of the real vanishing locus of a real holomorphic section of L d with the topology of the real vanishing locus a real holomorphic section of L d' for a sufficiently smaller d'<d. Such a statement is inspired by a recent work of Diatta and Lerario.