Issue Date | Title | Author(s) | Source | scopus | WOS | Fulltext/Archive link |
2013 | Uniqueness and solution structure of nonlinear equations arising from the Chern-Simons gauged O(3) sigma models | Choe, K.; Han, J.; Lin, C.-S.; Lin, T.-C.; TAI-CHIA LIN ; CHANG-SHOU LIN | Journal of Differential Equations | 19 | 19 | |
2009 | Uniqueness and structure of solutions to the Dirichlet problem for an elliptic system | Chern, J.-L.; Chen, Z.-Y.; Tang, Y.-L.; CHANG-SHOU LIN | Journal of Differential Equations | 11 | 10 | |
2011 | Uniqueness and symmetry results for solutions of a mean field equation on S{double-struck}2 via a new bubbling phenomenon | Bartolucci, D.; CHANG-SHOU LIN ; Tarantello, G. | Communications on Pure and Applied Mathematics | 21 | 21 | |
2019 | Uniqueness of bubbling solutions with collapsing singularities | Lee, Y.; CHANG-SHOU LIN | Journal of Functional Analysis | 1 | 1 | |
2000 | Uniqueness of conformal metrics with prescribed total curvature in R 2 | CHANG-SHOU LIN | Calculus of Variations and Partial Differential Equations | 12 | | |
2000 | Uniqueness of conformal metrics with prescribed total curvature in R2 | CHANG-SHOU LIN | Calculus of Variations and Partial Differential Equations | 12 | 12 | |
1994 | Uniqueness of least energy solutions to a semilinear elliptic equation in ℝ2 | CHANG-SHOU LIN | Manuscripta Mathematica | 61 | 55 | |
2007 | Uniqueness of multiple-spike solutions via the method of moving planes | Lin, C. S.; Wei, J. C.; CHANG-SHOU LIN | Pure and Applied Mathematics Quarterly | 1 | 2 | |
2014 | Uniqueness of non-topological solutions for the Chern-Simons system with two Higgs particles | Huang, H.-Y.; CHANG-SHOU LIN | Kodai Mathematical Journal | 4 | 4 | |
2006 | Uniqueness of solution for a meanfield equation on torus | Lin, C. S.; Marcello L.; LinCS | Journal of Differential Equations | | | |
2006 | Uniqueness of solutions for a mean field equation on torus | CHANG-SHOU LIN ; Lucia, M. | Journal of Differential Equations | 29 | 29 | |
2011 | Uniqueness of solutions to mean field equations of Liouville type in two-dimension., Geometry and analysis. No. 1, 419-446, Adv. Lect. Math.(ALM),17,Int. Press, Somerville, MA, 2011.Adv. Lect. | CHANG-SHOU LIN | | | | |
2000 | Uniqueness of solutions to the mean field equations for the spherical onsager vortex | CHANG-SHOU LIN | Archive for Rational Mechanics and Analysis | 58 | 58 | |
1991 | Uniqueness of the Ground State Solutions of ∆u+ f(u)=0 in R<sup>n</sup>, n ≥ 3 | CHIUN-CHUAN CHEN ; CHANG-SHOU LIN | Communications in Partial Differential Equations | 116 | 110 | |
1991 | Uniqueness of the ground state solutions of△ u+ f (u)= 0 in Rn, n≥ 3 | Chen, Chiun-Chuan; CHANG-SHOU LIN | Communications in Partial Differential Equations | | | |
2015 | Uniqueness of topological multi-vortex solutions for a skew-symmetric Chern-Simons system | Huang, H.-Y.; Lee, Y.; CHANG-SHOU LIN | Journal of Mathematical Physics | 2 | 2 | |
2010 | Uniqueness of topological solutions and the structure of solutions for the Chern-Simons system with two higgs particles | Chern, J.-L.; Chen, Z.-Y.; CHANG-SHOU LIN | Communications in Mathematical Physics | 37 | 38 | |
2015 | Uniqueness of topological solutions of self-dual Chern-Simons equation with collapsing vortices | Huang, G.; CHANG-SHOU LIN | Journal of Differential Equations | 1 | 1 | |
2009 | Uniqueness results for mean field equations with singular data | Bartolucci, D.; CHANG-SHOU LIN | Communications in Partial Differential Equations | 26 | 26 | |
2017 | Unitary monodromy implies the smoothness along the real axis for some Painleve VI equation, I | Chen, Z.; Kuo, T.-J.; CHANG-SHOU LIN | Journal of Geometry and Physics | 3 | 3 | |