Random fields and the enumerative geometry of lines on real and complex hypersurfaces

Abstract

We derive a formula expressing the average number En of real lines on a random hypersurface of degree 2n-3 in RPn in terms of the expected modulus of the determinant of a special random matrix. In the case n=3 we prove that the average number of real lines on a random cubic surface in RP3 equals: E3=62-3. Our technique can also be used to express the number Cn of complex lines on a generic hypersurface of degree 2n-3 in CPn in terms of the determinant of a random Hermitian matrix. As a special case we obtain a new proof of the classical statement C3=27. We determine, at the logarithmic scale, the asymptotic of the quantity En, by relating it to Cn (whose asymptotic has been recently computed D. Zagier). Specifically we prove that: n ∞ En Cn=12. Finally we show that this approach can be used to compute the number Rn=(2n-3)!! of real lines, counted with their intrinsic signs, on a generic real hypersurface of degree 2n-3 in RPn.