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Publications of Didong Li    :chronological  by type listing:

%%    
@article{fds341320,
   Author = {Dongxiao Yang and Didong Li and Huafei Sun},
   Title = {2D Dubins Path in Environments with Obstacle},
   Journal = {Mathematical Problems in Engineering},
   Volume = {2013},
   Year = {2013},
   url = {https://www.hindawi.com/journals/mpe/2013/291372/},
   Doi = {10.1155/2013/291372},
   Key = {fds341320}
}

@article{fds337143,
   Author = {Wang, J and Sun, H and Li, D},
   Title = {A Geodesic-Based Riemannian Gradient Approach to Averaging
             on the Lorentz Group},
   Journal = {Entropy},
   Volume = {19},
   Number = {12},
   Pages = {698-698},
   Publisher = {MDPI AG},
   Year = {2017},
   Month = {December},
   url = {https://www.mdpi.com/1099-4300/19/12/698/},
   Doi = {10.3390/e19120698},
   Key = {fds337143}
}

@article{fds346337,
   Author = {Cao, L and Li, D and Zhang, E and Zhang, Z and Sun, H},
   Title = {A Statistical Cohomogeneity One Metric on the Upper Plane
             with Constant Negative Curvature},
   Journal = {Advances in Mathematical Physics},
   Volume = {2014},
   Pages = {1-6},
   Publisher = {Hindawi Limited},
   Year = {2014},
   url = {https://www.hindawi.com/journals/amp/2014/832683/abs/},
   Abstract = {<jats:p>we analyze the geometrical structures of statistical
             manifold<jats:italic>S</jats:italic>consisting of all the
             wrapped Cauchy distributions. We prove that<jats:italic>S</jats:italic>is
             a simply connected manifold with constant negative
             curvature??<mml:mi>K</mml:mi><mml:mo>=</mml:mo><mml:mo>-</mml:mo><mml:mn>2</mml:mn></mml:math>.
             However, it is not isometric to the hyperbolic space
             because<jats:italic>S</jats:italic>is noncomplete. In
             fact,<jats:italic>S</jats:italic>is approved to be a
             cohomogeneity one manifold. Finally, we use several tricks
             to get the geodesics and explore the divergence performance
             of them by investigating the Jacobi vector
             field.</jats:p>},
   Doi = {10.1155/2014/832683},
   Key = {fds346337}
}

@article{fds341808,
   Author = {Didong Li and David B Dunson},
   Title = {Classification via local manifold approximation},
   Year = {2019},
   url = {http://arxiv.org/abs/1903.00985},
   Key = {fds341808}
}

@article{fds341807,
   Author = {D. Li and Minerva Mukhopadhyay and David Dunson},
   Title = {Efficient Manifold and Subspace Approximations with
             Spherelets},
   Year = {2018},
   url = {http://arxiv.org/abs/1706.08263},
   Key = {fds341807}
}

 

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