A complex-analytic characterization of Lagrangian immersions in Cn with transverse double points

Abstract

Given a compact smooth totally real immersed n-submanifold M⊂ Cn with only finitely many transverse double points, it is known that if M is Lagrangian with respect to some K\"ahler form on Cn, then it is rationally convex in Cn (Gayet, 2000), but the converse is not true (Mitrea, 2020). We show that M is Lagrangian with respect to some K\"ahler form on Cn if and only if M is rationally convex and at each double point, the pair of transverse tangent planes to M satisfies the following diagonalizability condition: there is a complex linear transformation on Cn that maps the pair to ( Rn,(D+i) Rn) for some real diagonal n× n matrix D.

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