- Galois Theory and Diophantine geometry Minhyong Kim
- Galois Theory and Diophantine geometry Minhyong Kim
- Galois Theory and Diophantine geometry Minhyong Kim
- Curriculum Vitae Minhyong Kim
- Motives and Diophantine geometry IV
- arXiv:math/0210356v1[math.NT]23Oct2002 A note on Szpiro's inequality for curves of higher
- Non-linearity, fundamental groups, and Diophantine
- Fundamental groups, polylogarithms, and Dio-phantine geometry
- Appendix and erratum: `Massey products for elliptic curves of rank 1 '
- Remark on fundamental groups and effective Diophantine methods for hyperbolic curves
- Some matrix groups Minhyong Kim
- Fundamental groups and Diophantine geometry Minhyong Kim
- Diophantine geometry and non-abelian duality Minhyong Kim
- Non-abelian cohomology varieties in Diophantine
- Galois groups and fundamental groups Minhyong Kim
- Motives and Diophantine geometry II
- Galois Theory and Diophantine geometry Minhyong Kim
- Mathematical Research Letters 12, 155169 (2005) THE HYODO-KATO THEOREM FOR RATIONAL
- The unipotent Albanese map and Diophantine geometry Minhyong Kim
- Galois theory and Diophantine geometry
- Fundamental groups, polylogarithms, and Dio-phantine geometry
- Galois Theory and Diophantine geometry Minhyong Kim
- Motives and Diophantine geometry III
- Fundamental groups and Diophantine geometry
- An introduction to motives I: classical motives and motivic L-functions
- Galois Theory and Diophantine geometry Minhyong Kim
- Fundamental groups and Diophantine geometry Minhyong Kim
- Selected Publications Minhyong Kim
- Selmer varieties for curves with CM Jacobians John Coates and Minhyong Kim
- Massey products for elliptic curves of rank 1 Minhyong Kim
- DOI: 10.1007/s00222-004-0433-9 Invent. math. 161, 629656 (2005)
- arXiv:math/0201183v3[math.AG]5Jul2002 A vanishing theorem for Fano varieties in positive
- arXiv:math/0305281v1[math.NT]19May2003 Torsion points on modular curves and Galois
- arXiv:0910.1725v1[math.NT]9Oct2009 Non-abelian fundamental groups in arithmetic geometry
- Galois Theory and Diophantine geometry 12 Minhyong Kim
- Galois Theory and Diophantine geometry 4 Minhyong Kim
- Non-linearity, fundamental groups, and Diophantine
- Fundamental groups and Diophantine geome-arithmetic topology
- Fundamental groups and Diophantine geome-arithmetic topology
- Fundamental groups and Diophantine geometry Minhyong Kim
- Solutions, points, arrows, and paths Minhyong Kim
- Anabelian geometry, path spaces, and Diophantine geometry
- Why everyone should know number theory Minhyong Kim
- Comments on the Chinese remainder theorem Minhyong Kim
- Motives and Diophantine July 2, 2006
- Motives and Diophantine July 7, 2006
- Publ. RIMS, Kyoto Univ. 45 (2009), 89133
- p-adic L-functions and Selmer varieties associated to elliptic curves with complex multiplication
- Mathematical Vistas Minhyong Kim
- arXiv:math/0502224v1[math.NT]10Feb2005 On relative computability for curves
