Invariants of Lagrangian cobordisms via spectral numbers

Mads R. Bisgaard

doi:10.1142/s1793525319500092

Invariants of Lagrangian cobordisms via spectral numbers

Journal of Topology and Analysis ◽

10.1142/s1793525319500092 ◽

2019 ◽

Vol 11 (01) ◽

pp. 205-231 ◽

Cited By ~ 1

Author(s):

Mads R. Bisgaard

Keyword(s):

Spectral Invariants ◽

Lagrangian Cobordisms ◽

Lagrangian Cobordism

We extend parts of the Lagrangian spectral invariants package recently developed by Leclercq and Zapolsky to the theory of Lagrangian cobordism developed by Biran and Cornea. This yields a nondegenerate Lagrangian “spectral metric” which bounds the Lagrangian “cobordism metric” (recently introduced by Cornea and Shelukhin) from below. It also yields a new numerical Lagrangian cobordism invariant as well as new ways of computing certain asymptotic Lagrangian spectral invariants explicitly.

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In simply connected cotangent bundles, exact Lagrangian cobordisms are h-cobordisms

Advances in Geometry ◽

10.1515/advgeom-2019-0027 ◽

2019 ◽

Vol 0 (0) ◽

Author(s):

Hiro Lee Tanaka

Keyword(s):

Connected Manifold ◽

Cotangent Bundles ◽

Lagrangian Cobordisms ◽

Simply Connected ◽

Lagrangian Cobordism

Abstract Let Q be a simply connected manifold. We show that every exact Lagrangian cobordism between compact, exact Lagrangians in T*Q is an h-cobordism. This is a corollary of the Abouzaid–Kragh Theorem.

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OBSTRUCTIONS TO THE EXISTENCE AND SQUEEZING OF LAGRANGIAN COBORDISMS

Journal of Topology and Analysis ◽

10.1142/s179352531000029x ◽

2010 ◽

Vol 02 (02) ◽

pp. 203-232 ◽

Cited By ~ 4

Author(s):

JOSHUA M. SABLOFF ◽

LISA TRAYNOR

Keyword(s):

Qualitative And Quantitative ◽

Rectangular Cylinder ◽

Lagrangian Cobordisms ◽

Lagrangian Cobordism

Capacities that provide both qualitative and quantitative obstructions to the existence of a Lagrangian cobordism between two (n - 1)-dimensional submanifolds in parallel hyperplanes of ℝ2n are defined using the theory of generating families. Qualitatively, these capacities show that, for example, in ℝ4 there is no Lagrangian cobordism between two ∞-shaped curves with a negative crossing when the lower end is "smaller". Quantitatively, when the boundary of a Lagrangian ball lies in a hyperplane of ℝ2n, the capacity of the boundary gives a restriction on the size of a rectangular cylinder into which the Lagrangian ball can be squeezed.

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