The complete classification of isotopy classes of degree three symplectic curves in CP2 via a novel algebraic theory of braid monodromy

Abstract

We develop a new algebraic theory of positive braids and conjugacy classes in the braid group B3. We use our theory to establish a complete classification of isotopy classes of degree three symplectic curves in CP2 with only An-singularities for n≥ 1 (an An-singularity is locally modelled by the equation z2 = wn) independent of Gromov's theory of pseudoholomorphic curves. We show that if C and C' are degree three symplectic curves in CP2 with the same numbers of An-singularities for each n≥ 1, then C is isotopic to C'. Furthermore, our theory furnishes a single method of proof that independently establishes and unifies several fundamental classification results on degree three symplectic curves in CP2. In particular, we prove using our theory: (1) there is a unique isotopy class of degree three smooth symplectic curves in CP2 (a result due to Sikorav), (2) the number of nodes is a complete invariant of the isotopy class of a degree three nodal symplectic curve in CP2 (the case of irreducible nodal curves is due to Shevchishin and the case of reducible nodal curves is due to Golla-Starkston), and (3) there is a unique isotopy class of degree three cuspidal symplectic curves in CP2 (a generalization of a result due to Ohta-Ono). The present work represents the first step toward resolving the symplectic isotopy conjecture using purely algebraic techniques in the theory of braid groups. Finally, we independently establish a complete classification of genus one Lefschetz fibrations over S2 (a result due to Moishezon-Livne).