|
|
|
|
|
|
Wenhui Shi
Past Members
|
| |
|
|
| |
|
Publications |
|
SHI, Wenhui, VOROTNIKOV, Dmitry (2019). The gradient flow of the potential energy on the space of arcs. Calculus of Variations and Partial Differential Equations. Vol. 58. 59, pp. 1-27.
|
|
SHI, Wenhui, VOROTNIKOV, Dmitry (2019). Uniformly compressing mean curvature flow. Journal of Geometric Analysis. Vol. 29. 4, pp. 3055-3097.
|
|
SHI, Wenhui (2018). An epiperimetric inequality approach to the parabolic Signorini problem. DMUC 18-43 Preprint.
|
|
SHI, Wenhui, VOROTNIKOV, Dmitry (2017). Uniformly compressing mean curvature flow. DMUC 17-45 Preprint.
|
|
SHI, Wenhui, VOROTNIKOV, Dmitry (2017). The gradient flow of the potential energy on the space of arcs. DMUC 17-08 Preprint.
|
|
KOCH, Herbert, RULAND, Angkana, SHI, Wenhui (2017). The variable coefficient thin obstacle problem: higher regularity. Advances in Differential Equations. Vol. 22. 11-12, pp. 793-866.
|
|
KOCH, Herbert, RULAND, Angkana, SHI, Wenhui (2017). The variable coefficient thin obstacle problem: optimal regularity and regularity of the regular free boundary. Annales de l'Institut Henri Poincare (C) Non Linear Analysis. Vol. 34. 4, pp. 845-897.
|
|
RULAND, Angkana, SHI, Wenhui (2017). Optimal regularity for the thin obstacle problem with C^{0,\alpha} coefficients. Calculus of Variations and Partial Differential Equations. Vol. 56. 5, pp. 1-41.
|
|
KOCH, Herbert, RULAND, Angkana, SHI, Wenhui (2016). Higher Regularity for the fractional thin obstacle problem. arXiv:1605.06662 Preprint.
|
|
KOCH, Herbert, RULAND, Angkana, SHI, Wenhui (2016). The variable coefficient thin obstacle problem: higher regularity. arXiv:1605.02002 Preprint.
| Number of registers: 17<< previous 1,2 next >>
|
| |
|
|
|
|
|
|
|
|
© 2012 Centre for Mathematics, University of Coimbra, funded by
Powered by: rdOnWeb
v1.4 | technical support
|
|
|
|
