A lower bound for the radius of Weinstein's Lagrangian tubular neighborhood

Abstract

For an immersed Lagrangian submanifold L in a K\"ahler manifold (M,ω), there exists a symplectic local diffeomorphism from a tubular neighborhood of the image of the zero section in the normal bundle TL of L, equipped with a canonical symplectic form ω, to (M,ω) whose restriction to L is the identity map by Weinstein's Lagrangian tubular neighborhood theorem, where the image of the zero section in TL is identified with L. In this paper, we give a lower bound for the supremum of the radii of tubular neighborhoods that have such a symplectic diffeomorphism into (M,ω) from below by a constant explicitly given in terms of up to second derivatives of the Riemannian curvature tensor of M and the second fundamental form of L. We also give a similar lower bound in the case where L is compact and embedded.

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