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SPECIAL LAGRANGIAN CONES IN $\C^3$ AND PRIMITIVE HARMONIC MAPS - MaRDI portal

SPECIAL LAGRANGIAN CONES IN $\C^3$ AND PRIMITIVE HARMONIC MAPS

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Publication:4467881

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DOI10.1112/S0024610703004204zbMath1167.53314arXivmath/0201157OpenAlexW1925267804WikidataQ126036972 ScholiaQ126036972MaRDI QIDQ4467881

Ian McIntosh

Publication date: 10 June 2004

Published in: Journal of the London Mathematical Society (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/math/0201157

Mathematics Subject Classification ID

Differential geometric aspects of harmonic maps (53C43) Harmonic maps, etc. (58E20) Calibrations and calibrated geometries (53C38)

Related Items (21)

The geometric complexity of special Lagrangian \(T^2\)-cones ⋮ Minimal Legendrian submanifolds of \(S^{2n+1}\) and absolutely area-minimizing cones ⋮ Hamiltonian stationary Lagrangian surfaces in \(\mathbb C \mathbb{P}^{2}\) ⋮ Obstructions to special Lagrangian desingularizations and the Lagrangian prescribed boundary problem ⋮ Special Lagrangian cones with higher genus links ⋮ Timelike minimal Lagrangian surfaces in the indefinite complex hyperbolic two-space ⋮ Minimal Lagrangian surfaces in \(\mathbb{CH}^2\) and representations of surface groups into \(SU(2,1)\) ⋮ Minimal surfaces and Colding-Minicozzi entropy in complex hyperbolic space ⋮ Associative cones and integrable systems ⋮ The classification of Hamiltonian stationary Lagrangian tori in \({{\mathbb {CP}}^2}\) by their spectral data ⋮ Calibrated Submanifolds ⋮ Ruh-Vilms theorems for minimal surfaces without complex points and minimal Lagrangian surfaces in \(\mathbb{C}P^2\) ⋮ Minimal Lagrangian surfaces in \(\mathbb{C}P^2\) via the loop group method. I: The contractible case ⋮ On extending calibration pairs ⋮ Formal Killing fields for minimal Lagrangian surfaces in complex space forms ⋮ Survey on real forms of the complex \(A_2^{(2)}\)-Toda equation and surface theory ⋮ A Schwarz lemma for Kähler affine metrics and the canonical potential of a proper convex cone ⋮ Examples of Hamiltonian stationary Lagrangian tori in \(\mathbb CP^2\) ⋮ Construction of Lagrangian self-similar solutions to the mean curvature flow in \(\mathbb C^n\) ⋮ Equivariant gluing constructions of contact stationary Legendrian submanifolds in \({\mathbb {S}^{2n+1}}\) ⋮ Strominger-Yau-Zaslow geometry, affine spheres and Painlevé III

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