Larry L. Schumaker
Affiliations: | Vanderbilt University, Nashville, TN |
Area:
Mathematics, Theoretical MathematicsGoogle:
"Larry Schumaker"Children
Sign in to add traineeTanya M. Morton | grad student | 2000 | Vanderbilt |
Vera Y. Rayevskaya | grad student | 2003 | Vanderbilt |
Tatyana Sorokina | grad student | 2004 | Vanderbilt |
Yuliya Babenko | grad student | 2006 | Vanderbilt |
Lujun Wang | grad student | 2012 | Vanderbilt |
BETA: Related publications
See more...
Publications
You can help our author matching system! If you notice any publications incorrectly attributed to this author, please sign in and mark matches as correct or incorrect. |
Schumaker LL. (2019) Solving Elliptic PDE’s on Domains with Curved Boundaries with an Immersed Penalized Boundary Method Journal of Scientific Computing. 80: 1369-1394 |
Ainsworth M, Davydov O, Schumaker LL. (2016) Bernstein-Bézier finite elements on tetrahedral–hexahedral–pyramidal partitions Computer Methods in Applied Mechanics and Engineering. 304: 140-170 |
Schenck HK, Schumaker LL, Sorokina T. (2015) Multivariate Splines and Algebraic Geometry Oberwolfach Reports. 12: 1139-1200 |
Schumaker LL, Speleers H. (2014) Convexity preserving C0 splines Advances in Computational Mathematics. 40: 117-135 |
Schumaker LL, Wang L. (2013) On Hermite interpolation with polynomial splines on T-meshes Journal of Computational and Applied Mathematics. 240: 42-50 |
Schumaker LL. (2013) Splines on spherical triangulations with hanging vertices Computer Aided Geometric Design. 30: 263-275 |
Schumaker LL, Wang L. (2012) Approximation power of polynomial splines on T-meshes Computer Aided Geometric Design. 29: 599-612 |
Schumaker LL, Wang L. (2012) Splines on Triangulations with Hanging Vertices Constructive Approximation. 36: 487-511 |
Schumaker LL, Speleers H. (2011) Convexity preserving splines over triangulations Computer Aided Geometric Design. 28: 270-284 |
Schumaker LL, Wang L. (2011) Spline spaces on TR-meshes with hanging vertices Numerische Mathematik. 118: 531-548 |