Chung Pang Mok
Office: 889 Evans Hall, Berkeley
Phone: (510)-642-2066
Curriculum Vitae
Email address: mok@math.berkeley.edu
Research
I'm currently working on p-adic L functions, and applications of theta correspondence to central values of L functions.
Research Statement
Papers:
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. , to appear in journal of number theory vol. 130 (2010).
Heegner points and p-adic L functions for elliptic curves over certain totally real fields , submitted to Commentarii Mathematici Helvetici.
Exceptional Zero Conjecture for Hilbert modular forms
Improved version of the thesis. Compositio Mathematica, Volume 145 Part 1 (January 2009).
Exceptional Zero Conjecture for Hilbert modular forms
Harvard Thesis.
Sato Tate conjecture for abelian varieties with real multiplication over function fields
Mathematics Research Letters, Vol. 14, Issue 1, 2007.
Teachings
Fall 2009
Math 115, Introduction to Number Theory
Math 121A, Mathematical Methods for Physical Sciences