Combinatorial extension of a simple construction of Lefschetz fibrations

Abstract

In a previous work, we introduced a simple and systematic method for constructing a positive allowable Lefschetz fibration (PALF) from a 2-handlebody decomposition of a given Stein surface. In this paper, we present a combinatorial extension of this construction, focusing on the flexibility of the regular fiber. By introducing variations in the isotopy of the 0-handle during the construction process, we obtain PALFs whose total spaces are diffeomorphic to the original Stein surface but which possess different regular fibers. As a primary application, we prove the existence of PALFs with genus 1 regular fibers whose total spaces are diffeomorphic to the knot traces of Legendrian positive twist knots and positive torus knots T2, 2n+1. Furthermore, we explicitly compare our PALF associated with the positive torus knot T2, 2n+1 to the specific open book decomposition generated by Avdek's Algorithm 2, demonstrating that the regular fiber and monodromy of our construction coincide with the page and monodromy of the corresponding open book.