Mathematics Colloquia and Seminars

Return to Colloquia & Seminar listing

The arithmetic of power series and applications

Algebraic Geometry and Number Theory

Speaker: Yunqing Tang, UC Berkeley
Related Webpage: https://math.berkeley.edu/~ytang/
Location: 1147 MSB
Start time: Thu, Feb 29 2024, 3:10PM

Borel and Dwork gave conditions on when a nice power series with rational number coefficients comes from a rational function in terms of meromorphic convergence radii at all places. Such a criterion was used in Dwork’s proof of the rationality of zeta functions of varieties over finite fields. Later, the work of Andre, Bost, Charles and many others generalized the rationality criterion of Borel--Dwork and deduced many applications in the arithmetic of differential equations and elliptic curves. In this talk, we will discuss some further refinements and generalizations of the criteria of Andre and Bost and their applications to the unbounded denominators conjecture for modular forms and irrationality of certain product of two log values. This is joint work (some part in progress) with Frank Calegari and Vesselin Dimitrov.