Chung Pang Mok
Office: Lady Shaw Building Room 212
Phone: 26097976
Curriculum Vitae
Email address: cpmok@math.cuhk.edu.hk
Research
I'm currently working on p-adic L functions, and the arithmetic applications of the theory of eigenvarieties.
Research Statement
Papers: (MathScinet Review)
On Teitelbaum type L-invariant of Hilbert Modular Forms attached to definite quaternions (joint with Masataka Chida and Jeehoon Park), submitted.
L-invariant of the adjoint Galois representation of modular forms of finite slope , submitted.
Rational points and p-adic L-functions on nearly ordinary Hida families over totally real fields.
Special values of L-functions of elliptic curves over Q and their base change to real quadratic fields. Journal of number theory vol. 130 (2010).
Heegner points and p-adic L functions for elliptic curves over certain totally real fields , to appear in Commentarii Mathematici Helvetici, Vol. 86, issue 4 (2011).
Exceptional Zero Conjecture for Hilbert modular forms
Improved version of the thesis. Compositio Mathematica, Volume 145 Part 1 (January 2009).
Sato Tate conjecture for abelian varieties with real multiplication over function fields
Mathematics Research Letters, Vol. 14, Issue 1, 2007.
Teachings
Fall 2010
Math 3030, Algebra I
Workshops
Number Theory Day
Study workshop on the work of Skinner-Urban on the Iwasawa main conjecture for GL_2