Harmonic maps
After a brief introduction, we consider three main results in the existence theory of harmonic maps between manifolds. The first is the heat-equation proof of Eells and Sampson, which says that minimal harmonic maps of compact manifolds into compact manifolds with nonpositive curvature always exist....
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McGill University
1990
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ndltd-LACETR-oai-collectionscanada.gc.ca-QMM.595582014-02-13T03:54:42ZHarmonic mapsAnand, Christopher KumarMathematics.After a brief introduction, we consider three main results in the existence theory of harmonic maps between manifolds. The first is the heat-equation proof of Eells and Sampson, which says that minimal harmonic maps of compact manifolds into compact manifolds with nonpositive curvature always exist. The next two results show they exist among maps of compact Riemann surfaces into compact manifolds, N, with $ pi sb2$(N) = 0. One proof uses the induced $ pi sb1$-action of Schoen and Yau; the other a perturbation of the action due to Sacks and Uhlenbeck. As required, we also develop some of the regularity theory, especially that for surfaces.McGill University1990Electronic Thesis or Dissertationapplication/pdfenalephsysno: 001073589proquestno: AAIMM63707Theses scanned by UMI/ProQuest.All items in eScholarship@McGill are protected by copyright with all rights reserved unless otherwise indicated.Master of Science (Department of Mathematics and Statistics.) http://digitool.Library.McGill.CA:80/R/?func=dbin-jump-full&object_id=59558 |
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NDLTD |
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en |
| format |
Others
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NDLTD |
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Mathematics. |
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Mathematics. Anand, Christopher Kumar Harmonic maps |
| description |
After a brief introduction, we consider three main results in the existence theory of harmonic maps between manifolds. The first is the heat-equation proof of Eells and Sampson, which says that minimal harmonic maps of compact manifolds into compact manifolds with nonpositive curvature always exist. The next two results show they exist among maps of compact Riemann surfaces into compact manifolds, N, with $ pi sb2$(N) = 0. One proof uses the induced $ pi sb1$-action of Schoen and Yau; the other a perturbation of the action due to Sacks and Uhlenbeck. As required, we also develop some of the regularity theory, especially that for surfaces. |
| author |
Anand, Christopher Kumar |
| author_facet |
Anand, Christopher Kumar |
| author_sort |
Anand, Christopher Kumar |
| title |
Harmonic maps |
| title_short |
Harmonic maps |
| title_full |
Harmonic maps |
| title_fullStr |
Harmonic maps |
| title_full_unstemmed |
Harmonic maps |
| title_sort |
harmonic maps |
| publisher |
McGill University |
| publishDate |
1990 |
| url |
http://digitool.Library.McGill.CA:80/R/?func=dbin-jump-full&object_id=59558 |
| work_keys_str_mv |
AT anandchristopherkumar harmonicmaps |
| _version_ |
1716641284476633088 |