Infinitely many Lefschetz pencils on ruled surfaces

Abstract

We show that any ruled surface X with (X) < 0 admits infinitely many inequivalent Lefschetz pencils of fixed genus and number of base points. Our proof proceeds by building infinitely many inequivalent Lefschetz fibrations on a blow-up X \# 4 CP2 of X with constant fiber class, via a mechanism known as partial conjugation. Furthermore, there exists a symplectic form on X compatible with all such pencils, and similarly for the fibrations in X\#4CP2. This provides the first example of this phenomenon and makes progress on Problem 4.98 of the K3 list of problems in low-dimensional topology in the case of ruled surfaces.