WIAS Preprint List: Si, Hang


  • 2602: Si, Hang
    On decomposition of embedded prismatoids in $R^3$ without additional points
    Appeared in: V.A. Garanzha, L. Kamenski, H. Si (eds.), Numerical Geometry, Grid Generation and Scientific Computing, vol. 143 of Lecture Notes in Comput. Sci. and Engrg., Springer, Cham, 2021, pp. 95--111.
  • 2554: Si, Hang
    On monotone sequences of directed flips, triangulations of polyhedra, and structural properties of a directed flip graph
  • 2373: Dassi, Franco; Kamenski, Lennard; Farrell, Patricio; Si, Hang
    Tetrahedral mesh improvement using moving mesh smoothing, lazy searching flips, and RBF surface reconstruction
    Appeared in: Comput. Aided Des., 102 (2018), pp. 2--13 (published online on 8.12.2017), DOI 10.1016/j.cad.2017.11.010 .
  • 2270: Dassi, Franco; Kamenski, Lennard; Si, Hang
    Tetrahedral mesh improvement using moving mesh smoothing and lazy searching flips
    Appeared in: Procedia Engineering, 163 (2016) pp. 302--314.
  • 2265: Dassi, Franco; Farrell, Patricio; Si, Hang
    A novel surface remeshing scheme via higher dimensional embedding and radial basis functions
    Appeared in: SIAM J. Sci. Comput., 39 (2017) pp. B522--B547, DOI 10.1137/16M1077015 .
  • 2190: Si, Hang; Goerigk, Nadja
    On tetrahedralisations of reduced Chazelle polyhedra with interior Steiner points
    Appeared in: 25th International Meshing Roundtable, S. Canann, S. Owen, H. Si, eds., vol. 163 of Procedia Engineering, Elsevier, Amsterdam, 2016, pp. 33--45
  • 2162: Dassi, Franco; Si, Hang; Perotto, Simona; Streckenbach, Timo
    Anisotropic finite element mesh adaptation via higher dimensional embedding
    Appeared in: Procedia Engineering, 124 (2015) pp. 265--277.
  • 2142: Goerigk, Nadja; Si, Hang
    On indecomposable polyhedra and the number of interior Steiner points
    Appeared in: Procedia Engineering, Volume 124, 2015, Pages 343--355
  • 2130: Huang, Weizhang; Kamenski, Lennard; Si, Hang
    Mesh smoothing: An MMPDE approach
    Appeared in: Research Notes, 24th International Meshing Roundtable (2015)
  • 1976: Shewchuk, Jonathan Richard; Si, Hang
    Higher-quality tetrahedral mesh generation for domains with small angles by constrained Delaunay refinement
    Appeared in: Proceedings of the Thirtieth Annual Symposium on Computational Geometry, Association for Computing Machinery, New York, NY, USA, 2014, pp. 290--299
  • 1850: Dassi, Franco; Si, Hang
    A curvature-adapted anisotropic surface remeshing method
    Appeared in: New Challenges in Grid Generation and Adaptivity for Scientific Computing, S. Perotto, L. Formaggia, eds., vol. 5 of SEMA SIMAI Springer Series, Springer International Publishing, Cham, 2015, pp. 19--41
  • 1762: Si, Hang
    TetGen, towards a quality tetrahedral mesh generator
    Appeared in: ACM Trans. Math. Software, 41 (2015) pp. 11:1--11:36.
  • 1530: Si, Hang; Gärtner, Klaus
    3D boundary recovery by constrained Delaunay tetrahedralization
    Appeared in: Internat. J. Numer. Methods Engrg., 85 (2011) pp. 1341--1364.
  • 1372: Si, Hang
    Constrained Delaunay tetrahedral mesh generation and refinement
    Appeared in: Finite Elem. Anal. Des., 46 pp. 33--46.
  • 1329: Si, Hang
    The existence of triangulations of non-convex polyhedra without new vertices
  • 1176: Si, Hang
    Adaptive tetrahedral mesh generation by constrained Delaunay refinement
    Appeared in: Internat. J. Numer. Methods Engrg., 75 (2008) pp. 856--880.

WIAS Technical Report List: Si, Hang


  • 13: Si, Hang
    TetGen: A quality tetrahedral mesh generator and a 3D Delaunay triangulator (Version 1.5 --- User's Manual)
  • 9: Si, Hang
    TetGen, A Quality Tetrahedral Mesh Generator and Three-Dimensional Delaunay Triangulator, v1.3 User's Manual
  • 4: Si, Hang
    TetGen. A 3D Delaunay tetrahedral mesh generator. v.1.2 Users manual