Irrational Complete Intersections

We prove that a complete intersection of $c$ very general hypersurfaces of degree at least two in $N$-dimensional complex projective space is not ruled (and therefore not rational) provided that the sum of the degrees of the hypersurfaces is at least $\tfrac{2}{3} N + c + 1$. To this end we consider a degeneration to positive characteristic, following Koll\'ar. Our argument does not require a resolution of the singularities of the special fiber of the degeneration. It relies on a generalization of Koll\'ar's "algebraic Morse lemma" that controls the dimensions of the second-order Thom-Boardman singularities of general sections of Frobenius pullbacks of vector bundles.