A dessin on the base: a description of mutually non-local 7-branes without using branch cuts

Abstract

We consider the special roles of the zero loci of the Weierstrass invariants g2(τ(z)), g3(τ(z)) in F-theory on an elliptic fibration over P1 or a further fibration thereof. They are defined as the zero loci of the coefficient functions f(z) and g(z) of a Weierstrass equation. They are thought of as complex co-dimension one objects and correspond to the two kinds of critical points of a dessin d'enfant of Grothendieck. The P1 base is divided into several cell regions bounded by some domain walls extending from these planes and D-branes, on which the imaginary part of the J-function vanishes. This amounts to drawing a dessin with a canonical triangulation. We show that the dessin provides a new way of keeping track of mutual non-localness among 7-branes without employing unphysical branch cuts or their base point. With the dessin we can see that weak- and strong-coupling regions coexist and are located across an S-wall from each other. We also present a simple method for computing a monodromy matrix for an arbitrary path by tracing the walls it goes through.