The study of zero mean curvature surfaces in $\mathbb{R}^3$ (minimal surfaces) has witnessed significant progress since its initiation over 200 years ago. However, the topics of maximal surfaces (ZMC surfaces) in the Lorentz-Minkowski space and ZMC surfaces in hyperbolic spaces, are relatively recent. The proposed meeting on Zero Mean Curvature surfaces aims to bring together leading experts in the areas to discuss a wide range of topics- new challenges, problem-solving methodologies. Early-career researchers will have the opportunity to engage with the most significant and promising problems within these domains. This discussion meeting is intended to inspire faculty, students, and postdocs to delve into this vibrant and evolving field of research.During the five-day discussion meeting, the final day will be reserved for open discussions to encourage potential collaborations. There will be mini-courses by subject experts of introductory nature for younger researchers, who are not e...
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Equivariant Minimal Surfaces in the Symmetric Spaces via Higgs Bundles. (Lecture 3)
John LoftinICTS:29531 -
3D-printed bone substitutes with triply periodic minimal surface microarchitectures (Lecture 2)
Franz E. WeberICTS:29542 -
Equivariant Minimal Surfaces in the Symmetric Spaces via Higgs Bundles. (Lecture 2)
John LoftinICTS:29530 -
Minimal Surfaces in Diblock Copolymers and geometric scaffolds in materials science (Lecture 2)- ONLINE
Randall KamienICTS:29540 -
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3D-printed bone substitutes: From pores to adaptive density minimal surface microarchitecture (Lecture1)
Franz E. WeberICTS:29541 -
Equivariant Minimal Surfaces in the Symmetric Spaces via Higgs Bundles (Lecture 1)
John LoftinICTS:29529 -
Minimal Surfaces in Diblock Copolymers and geometric scaffolds in materials science (Lecture 1)- ONLINE
Randall KamienICTS:29539 -