Symplectic Surgeries Along Certain Singularities and New Lefschetz Fibrations

Abstract

We define a new 4-dimensional symplectic cut and paste operations arising from the generalized star relations (ta0ta1ta2 ·s ta2g+1)2g+1 = tb1 tb2gtb3, also known as the trident relations, in the mapping class group g,3 of an orientable surface of genus g≥1 with 3 boundary components. We also construct new families of Lefschetz fibrations by applying the (generalized) star relations and the chain relations to the families of words (tc1tc2 ·s tc2g-1tc2gtc2g+12tc2gtc2g-1 ·s tc2tc1)2n = 1, (tc1tc2 ·s tc2gtc2g+1)(2g+2)n = 1 and (tc1tc2 ·s tc2g-1tc2g)2(2g+1)n = 1 in the mapping class group g of the closed orientable surface of genus g ≥ 1 and n ≥ 1. Furthemore, we show that the total spaces of some of these Lefschetz fibraions are irreducible exotic symplectic 4-manifolds. Using the degenerate cases of the generalized star relations, we also realize all elliptic Lefschetz fibrations and genus two Lefschetz fibrations over S2 with non-separating vanishing cycles.