15-nodal quartic surfaces.I: quintic del Pezzo surfaces and congruences of lines in $\bbP^3$ (1906.12295v2)

Abstract: We explain a classical construction of a del Pezzo surface of degree d = 4 or 5 as a smooth order two congruence of lines in 3-space whose focal surface is a quartic surface $X_{20-d}$ with 20-d ordinary double points. We also show that $X_{15}$ can be realized as a hyperplane section of the Castelnuovo-Richmond-Igusa quartic hypersurface. This leads to the proof of rationality of the moduli space of 15-nodal quartic surfaces. We discuss some other birational models of $X_{15}$: quartic symmetroids, 5-nodal quartic surfaces, 10-nodal sextic surfaces in $P^4$ and nonsingular surfaces of degree 10 in $P^6$. Finally we study some birational involutions of a 15-nodal quartic surface which, as it is shown in Part 2 of the paper jointly with I. Shimada, belong to a finite set of generators of the group of birational automorphisms of a general 15-nodal quartic surface.