Brian Seguin, Ph.D.
Affiliations: | 2010 | Carnegie Mellon University, Pittsburgh, PA |
Area:
Mathematics, Applied MechanicsGoogle:
"Brian Seguin"Parents
Sign in to add mentor| Walter Noll | grad student | 2010 | Carnegie Mellon | |
| (Frame-free continuum thermomechanics.) | ||||
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. |
| Seguin B. (2020) A fractional notion of length and an associated nonlocal curvature Journal of Geometric Analysis. 30: 1-21 |
| Seguin B, Chen Y, Fried E. (2020) Closed Unstretchable Knotless Ribbons and the Wunderlich Functional Journal of Nonlinear Science. 1-35 |
| Seguin B, Walkington NJ. (2020) Multi-component Multiphase Porous Flow Archive For Rational Mechanics and Analysis. 235: 2171-2196 |
| Seguin B. (2020) A transport theorem for nonconvecting open sets on an embedded manifold Continuum Mechanics and Thermodynamics. 32: 1-8 |
| Seguin B, Walkington NJ. (2019) Multi-Component Multiphase Flow Through a Poroelastic Medium Journal of Elasticity. 135: 485-507 |
| Seguin B. (2018) On the homogenization of a new class of locally periodic microstructures in linear elasticity with residual stress Mathematics and Mechanics of Solids. 23: 1025-1039 |
| Ptashnyk M, Seguin B. (2017) Homogenization of a viscoelastic model for plant cell wall biomechanics Esaim: Control, Optimisation and Calculus of Variations. 23: 1447-1471 |
| Ptashnyk M, Seguin B. (2016) Periodic Homogenization and Material Symmetry in Linear Elasticity Journal of Elasticity. 124: 225-241 |
| Seguin B, Hinz DF, Fried E. (2014) Extending the Transport Theorem to Rough Domains of Integration. Applied Mechanics Reviews. 66: 0508021-5080216 |
| Seguin B, Fried E. (2014) Microphysical derivation of the Canham-Helfrich free-energy density. Journal of Mathematical Biology. 68: 647-65 |