- ANISOTROPIC INTERFACE MOTION Jean E. Taylor
- [AW] and L. Wang, Mathematical existence of crystal growth with Gibbs Thomson curvature effects, in preparation.
- Original paper Soap Bubble Clusters
- Variational Methods for Microstructural Evolution W. Craig Carter y , Jean E. Taylor z , J. W. Cahn y
- A unified approach to motion of grain boundaries, relative tangential translation along grain boundaries, and grain rotation
- Surface Motion Due to Crystalline Surface Energy Gradient Flows Jean E. Taylor, Mathematics Department, Rutgers University, Piscataway, NJ 08*
- THERMODYNAMIC DRIVING FORCES AND EQUILIBRIUM IN MULTICOMPONENT SYSTEMS WITH ANISOTROPIC SURFACES
- May 20, 1999 Mathematical Models of Triple Junctions
- Linking Anisotropic Sharp and Diffuse Surface Motion Laws via Gradient Flows Jean E. Taylor and John W. Cahn
- A VARIATIONAL APPROACH TO CRYSTALLINE TRIPLE JUNCTION MOTION Jean E. Taylor
- Diffuse Interfaces with Sharp Corners and Facets: Phase Field Models with Strongly Anisotropic Surfaces
- THE MOTION OF MULTIPLE-PHASE JUNCTIONS UNDER PRESCRIBED PHASE-BOUNDARY VELOCITIES
- OPTIMAL GEOMETRY IN EQUILIBRIUM AND GROWTH by Fred Almgren & Jean E. Taylor
- Review for Bull Amer. Math. Soc. of Wulff Construction, A Global Shape from Local Interaction
- SURFACE MOTION DUE TO SURFACE ENERGY REDUCTION Jean E. Taylor, Math Dept, Rutgers Univ., Piscataway NJ 08855
- MOTION BY WEIGHTED MEAN CURVATURE IS AFFINE INVARIANT Jean E. Taylor
- THERMODYNAMIC DRIVING FORCES AND ANISOTROPIC INTERFACE MOTION Jean E. Taylor
- Interfaces and Free Boundaries 9 (2007), 493512 Shape accommodation of a rotating embedded crystal
