[HTML][HTML] A stable∞-category of Lagrangian cobordisms
D Nadler, HL Tanaka - Advances in Mathematics, 2020 - Elsevier
Given an exact symplectic manifold M and a support Lagrangian Λ⊂ M, we construct an∞-
category Lag Λ (M) which we conjecture to be equivalent (after specialization of the …
category Lag Λ (M) which we conjecture to be equivalent (after specialization of the …
[引用][C] A Stable Infinity-Category of Lagrangian Cobordisms
D Nadler, HL Tanaka - 2011 - pure.au.dk
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A stable infinity-category of Lagrangian cobordisms
D Nadler, HL Tanaka - arXiv e-prints, 2011 - ui.adsabs.harvard.edu
Given an exact symplectic manifold M and a support Lagrangian\Lambda, we construct an
infinity-category Lag, which we conjecture to be equivalent (after specialization of the …
infinity-category Lag, which we conjecture to be equivalent (after specialization of the …
A stable infinity-category of Lagrangian cobordisms
D Nadler, HL Tanaka - arXiv preprint arXiv:1109.4835, 2011 - arxiv.org
Given an exact symplectic manifold M and a support Lagrangian\Lambda, we construct an
infinity-category Lag, which we conjecture to be equivalent (after specialization of the …
infinity-category Lag, which we conjecture to be equivalent (after specialization of the …
[PDF][PDF] A STABLE∞-CATEGORY OF LAGRANGIAN COBORDISMS
D NADLER, HLEE TANAKA - arXiv preprint arXiv:1109.4835, 2011 - Citeseer
Given an exact symplectic manifold M and a support Lagrangian Λ⊂ M, we construct an∞-
category LagΛ (M) which we conjecture to be equivalent (after specialization of the …
category LagΛ (M) which we conjecture to be equivalent (after specialization of the …
A stable infinity-category of Lagrangian cobordisms
D Nadler, HL Tanaka - arXiv, 2011 - dml.mathdoc.fr
Given an exact symplectic manifold M and a support Lagrangian\Lambda, we construct an
infinity-category Lag, which we conjecture to be equivalent (after specialization of the …
infinity-category Lag, which we conjecture to be equivalent (after specialization of the …