Simplified SFT moduli spaces for Legendrian links

Abstract

We study moduli spaces M of holomorphic maps U from Riemann surfaces to R4 with boundaries on the Lagrangian cylinder over a Legendrian link ⊂ (R3, std). We allow our domains, , to have non-trivial topology in which case M is the zero locus of an obstruction function O, sending a moduli space of holomorphic maps in C to H1(). In general, O-1(0) is not combinatorially computable. However after a Legendrian isotopy, can be made left-right-simple, implying that any U of index 1 is a disk with one or two positive punctures for which πC U is an embedding. Moreover, any U of index 2 is either a disk or an annulus with πC U simply covered and without interior critical points. Therefore any SFT invariant of is combinatorially computable using only disks with ≤ 2 positive punctures.