On the 10-web by conics on the quartic del Pezzo surface

Abstract

We study and compare the webs W dPd defined by the conic fibrations on a given smooth del Pezzo surface dPd of degree d for d=4 and d=5. In a previous paper, we proved that for any positive d≤ 6, the web by conics W dPd carries a particular abelian relation HLogd, whose components all are weight 7-d antisymmetric hyperlogarithms. The web W dP5 is a geometric model of the exceptional Bol's web and the relation HLog5 corresponds to the famous `Abel's identity' ( Ab) of the dilogarithm. Bol's web together with ( Ab) enjoy several remarkable properties of different kinds. We show that almost all of them admit natural generalizations to the pair ( W dP4, HLog4).