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| </citation> | |
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| <author>Edelman</author> | |
| <volume>20</volume> | |
| <issue>2</issue> | |
| <first_page>303</first_page> | |
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| <doi provider="crossref">10.1137/S0895479895290954</doi> | |
| <article_title>The geometry of algorithms with orthogonality constraints</article_title> | |
| </citation> | |
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| <first_page>428</first_page> | |
| <cYear>2012</cYear> | |
| <doi provider="crossref">10.1016/j.imavis.2011.09.006</doi> | |
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| </citation> | |
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| <journal_title>ASME J. Mech. Des.</journal_title> | |
| <author>Park</author> | |
| <volume>117</volume> | |
| <first_page>36</first_page> | |
| <cYear>1995</cYear> | |
| <doi provider="crossref">10.1115/1.2826114</doi> | |
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| </citation> | |
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| <author>Crouch</author> | |
| <volume>5</volume> | |
| <issue>3</issue> | |
| <first_page>397</first_page> | |
| <cYear>1999</cYear> | |
| <doi provider="crossref">10.1023/A:1021770717822</doi> | |
| <article_title>The De Casteljau algorithm on Lie groups and spheres</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000030"> | |
| <journal_title>J. Approx. Theory</journal_title> | |
| <author>Popiel</author> | |
| <volume>148</volume> | |
| <issue>2</issue> | |
| <first_page>111</first_page> | |
| <cYear>2007</cYear> | |
| <doi provider="crossref">10.1016/j.jat.2007.03.002</doi> | |
| <article_title>Bézier curves and C2 interpolation in Riemannian manifolds</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000035"> | |
| <issn>0167-8396</issn> | |
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| <author>Nava-Yazdani</author> | |
| <volume>30</volume> | |
| <issue>7</issue> | |
| <first_page>722</first_page> | |
| <cYear>2013</cYear> | |
| <doi provider="crossref">10.1016/j.cagd.2013.06.002</doi> | |
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| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000040"> | |
| <author>De Casteljau</author> | |
| <cYear>1959</cYear> | |
| <series_title>Outillages Méthodes Calcul, Technical Report</series_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000045"> | |
| <author>Bézier</author> | |
| <cYear>1986</cYear> | |
| <series_title>The Mathematical Basis of the UNISURF CAD System</series_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000050"> | |
| <journal_title>Acta Appl. Math.</journal_title> | |
| <author>Absil</author> | |
| <volume>80</volume> | |
| <issue>2</issue> | |
| <first_page>199</first_page> | |
| <cYear>2004</cYear> | |
| <doi provider="crossref">10.1023/B:ACAP.0000013855.14971.91</doi> | |
| <article_title>Riemannian geometry of Grassmann manifolds with a view on algorithmic computation</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000055"> | |
| <unstructured_citation>U. Helmke, K. Hüper, J. Trumpf, Newton’s method on Graßmann manifolds. ArXiv Preprint - arXiv:0709.2205.</unstructured_citation> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000060"> | |
| <author>Kobayashi</author> | |
| <volume>vol. 2</volume> | |
| <cYear>1969</cYear> | |
| <series_title>Foundations of Differential Geometry</series_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000065"> | |
| <author>Horn</author> | |
| <cYear>1991</cYear> | |
| <series_title>Topics in Matrix Analysis</series_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000070"> | |
| <author>Higham</author> | |
| <cYear>2008</cYear> | |
| <doi provider="crossref">10.1137/1.9780898717778</doi> | |
| <isbn>978-0-898716-46-7</isbn> | |
| <series_title>Functions of Matrices: Theory and Computation</series_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000075"> | |
| <author>Krakowski</author> | |
| <cYear>2007</cYear> | |
| <series_title>ROBOMAT 07</series_title> | |
| <article_title>On the computation of the Karcher mean on spheres and special orthogonal groups</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000080"> | |
| <journal_title>C. R. Math.</journal_title> | |
| <author>Harms</author> | |
| <volume>350</volume> | |
| <issue>15–16</issue> | |
| <first_page>773</first_page> | |
| <cYear>2012</cYear> | |
| <doi provider="crossref">10.1016/j.crma.2012.08.010</doi> | |
| <article_title>Geodesics in infinite dimensional Stiefel and Grassmann manifolds</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000085"> | |
| <author>Absil</author> | |
| <cYear>2008</cYear> | |
| <series_title>Optimization Algorithms on Matrix Manifolds</series_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000090"> | |
| <journal_title>Neurocomputing</journal_title> | |
| <author>Nishimori</author> | |
| <volume>67</volume> | |
| <first_page>106</first_page> | |
| <cYear>2005</cYear> | |
| <doi provider="crossref">10.1016/j.neucom.2004.11.035</doi> | |
| <article_title>Learning algorithms utilizing quasi-geodesic flows on the Stiefel manifold</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000095"> | |
| <author>Rentmeesters</author> | |
| <cYear>2012</cYear> | |
| <series_title>Proc. MTNS</series_title> | |
| <article_title>Computing the Riemannian log map on the Stiefel manifold</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000100"> | |
| <author>Lee</author> | |
| <volume>vol. 176</volume> | |
| <cYear>1997</cYear> | |
| <series_title>Riemannian Geometry: An Introduction to Curvature</series_title> | |
| </citation> | |
| <!-- Original Citation key: 10.1016/j.cam.2016.07.018_br000105 UnstructuredCitiation: J. von Neumann, Some matrix inequalities and metrization of metric-space, in: Tomsk Univ. Rev. 1:286-300 (1937); in Collected Works, vol. IV, Pergamon, Oxford, 1962, 205–218. --> | |
| <citation key="#cr-split#-10.1016/j.cam.2016.07.018_br000105.1"> | |
| <unstructured_citation>J. von Neumann, Some matrix inequalities and metrization of metric-space, in: Tomsk Univ. Rev. 1:286-300 (1937)</unstructured_citation> | |
| </citation> | |
| <citation key="#cr-split#-10.1016/j.cam.2016.07.018_br000105.2"> | |
| <unstructured_citation>in Collected Works, vol. IV, Pergamon, Oxford, 1962, 205-218.</unstructured_citation> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000110"> | |
| <journal_title>Linear Algebra Appl.</journal_title> | |
| <author>Marques de Sá</author> | |
| <volume>197–198</volume> | |
| <first_page>429</first_page> | |
| <cYear>1994</cYear> | |
| <doi provider="crossref">10.1016/0024-3795(94)90499-5</doi> | |
| <article_title>Exposed faces and duality for symmetric and unitarily invariant norms</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000115"> | |
| <unstructured_citation>E. Nava-Yazdani, Geometric Mean, Splines and De Boor Algorithm in Geodesic Spaces. ArXiv Preprint - arXiv:1603.01484v3 [math.MG].</unstructured_citation> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000120"> | |
| <journal_title>J. Comput. Appl. Math.</journal_title> | |
| <author>Jakubiak</author> | |
| <volume>194</volume> | |
| <issue>2</issue> | |
| <first_page>177</first_page> | |
| <cYear>2006</cYear> | |
| <doi provider="crossref">10.1016/j.cam.2005.07.003</doi> | |
| <article_title>A two-step algorithm of smooth spline generation on Riemannian manifolds</article_title> | |
| </citation> | |
| <citation key="10.1016/j.cam.2016.07.018_br000125"> | |
| <journal_title>LMS J. Comput. Math.</journal_title> | |
| <author>Rodrigues</author> | |
| <volume>8</volume> | |
| <first_page>251</first_page> | |
| <cYear>2005</cYear> | |
| <doi provider="crossref">10.1112/S146115700000098X</doi> | |
| <article_title>A new geometric algorithm to generate smooth interpolating curves on Riemannian manifolds</article_title> | |
| </citation> | |
| </citation_list> | |
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