Handlebodies with constant curvature metrics and minimal surface boundary. (Record no. 34923)
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000 -LEADER | |
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fixed length control field | 02030n a2200265#a 4500 |
001 - CONTROL NUMBER | |
control field | 36067 |
003 - CONTROL NUMBER IDENTIFIER | |
control field | P5A |
005 - DATE AND TIME OF LATEST TRANSACTION | |
control field | 20221213140534.0 |
007 - PHYSICAL DESCRIPTION FIXED FIELD--GENERAL INFORMATION | |
fixed length control field | cr cuuuuuauuuu |
008 - FIXED-LENGTH DATA ELEMENTS--GENERAL INFORMATION | |
fixed length control field | 150203s2015 bl por d |
035 ## - SYSTEM CONTROL NUMBER | |
System control number | ocm51338542 |
040 ## - CATALOGING SOURCE | |
Original cataloging agency | P5A |
Transcribing agency | P5A |
090 ## - IMPA CODE FOR CLASSIFICATION SHELVES | |
IMPA CODE FOR CLASSIFICATION SHELVES | Congressos e Seminários. |
100 1# - MAIN ENTRY--PERSONAL NAME | |
Personal name | Anderson, Michael |
Affiliation | (Stony Brook University, USA) |
9 (RLIN) | 6761 |
245 10 - TITLE STATEMENT | |
Title | Handlebodies with constant curvature metrics and minimal surface boundary. |
260 ## - PUBLICATION, DISTRIBUTION, ETC. | |
Place of publication, distribution, etc. | Rio de Janeiro: |
Name of publisher, distributor, etc. | IMPA, |
Date of publication, distribution, etc. | 2015. |
300 ## - PHYSICAL DESCRIPTION | |
Extent | video online |
505 2# - FORMATTED CONTENTS NOTE | |
Formatted contents note | We study the moduli space of constant curvature metrics g on a 3-d handlebody with boundary having mean curvature 0, so minimal surface boundary (or more generally CMC boundary). This is a generalization of Alexandrov immersed minimal surfaces in 3-d space forms. We prove that this moduli space is a smooth manifold, locally diffeomorphic to the Teichmuller space of the boundary surface, when the genus of the boundary is at least 2. We conjecture that the spaces are in fact diffeomorphic (on each component). This result is false per se for genus 1 boundaries, but the method of proof gives rise to a new proof of Brendle's solution of the Lawson conjecture on embedded minimal tori in S^3. The talk will discuss the context and basic ideas of the proof. We hope to discuss relations and/or questions with hyperbolic 3-manifolds . |
650 04 - SUBJECT ADDED ENTRY--TOPICAL TERM | |
Topical term or geographic name entry element | Matematica. |
Source of heading or term | larpcal |
9 (RLIN) | 19899 |
697 ## - LOCAL SUBJECT | |
Local Subject | Congressos e Seminários. |
Linkage | 23755 |
711 2# - ADDED ENTRY--MEETING NAME | |
Meeting name or jurisdiction name as entry element | Hyperbolic Geometry and Minimal Surfaces |
Date of meeting or treaty signing | (2015: |
Location of meeting | IMPA, Rio de Janeiro, Brazil) |
9 (RLIN) | 6755 |
856 4# - ELECTRONIC LOCATION AND ACCESS | |
Public note | VIDEO |
Uniform Resource Identifier | <a href="https://www.youtube.com/watch?v=yWCYb6ef0u4&list=PLo4jXE-LdDTSse0dM2KDQFGXqPMkAQNaf&index=10">https://www.youtube.com/watch?v=yWCYb6ef0u4&list=PLo4jXE-LdDTSse0dM2KDQFGXqPMkAQNaf&index=10</a> |
856 4# - ELECTRONIC LOCATION AND ACCESS | |
Public note | RESUMOS |
Uniform Resource Identifier | <a href="https://impa.br/wp-content/uploads/2016/12/abstracts.pdf">https://impa.br/wp-content/uploads/2016/12/abstracts.pdf</a> |
942 ## - ADDED ENTRY ELEMENTS (KOHA) | |
Source of classification or shelving scheme | Dewey Decimal Classification |
Koha item type | Books |
No items available.