More on explicit correspondence between gradient trees in R and holomorphic convex quadrilaterals in T*R

Abstract

For given smooth functions (f1,…,fn) on M, Fukaya and Oh showed that the moduli space of pseudoholomorphic disks in T*M which are bounded by Lagrangian sections \Liε=graph(ε dfi)\ is diffeomorphic to the moduli space of gradient trees in M which consist of gradient curves of \fi-fj\. When the image of the pseudoholomorphic disk wε is a polygon in C T*R, we can describe wε by a Schwarz-Christoffel map. In S25, we proved that pseudoholomorphic disks wε converge to the gradient tree in the limit ε+0 when the image of wε is a generic convex quadrilateral. In this paper, we show such a convergence for any convex quadrilaterals by studying the non-generic case.

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